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2013 American Transactions on Engineering & Applied Sciences.

American Transactions on
Engineering & Applied Sciences
http://TuEngr.com/ATEAS

Smooth Particle Hydrodynamics for Bird­Strike 
Analysis Using LS­DYNA 
Vijay K. Goyal
a
b

a*

a

, Carlos A. Huertas , Thomas J. Vasko

b

Department of Mechanical Engineering, University of Puerto Rico at Mayagüez, PR 00680, USA
Engineering Department, Central Connecticut State University, New Britain, CT 06050, USA

ARTICLEINFO

A B S T RA C T

Article history:
Received December 23, 2012
Received in revised form
24 February 2013
Accepted February 26, 2013
Available online
March 04, 2013

In this second of a three-paper sequence, we developed a
standard work using the Smoothed Particle Hydrodynamic (SPH)
approach in LS-DYNA and compared the results against those the
Lagrangian model and available experimental results. First, the SPH
model was validated against a one-dimensional beam centered
impact’s analytical solution and the results are within 3% error.
Bird-strike events were divided into three separate problems: frontal
impact on rigid flat plate, 0 and 30 deg impact on deformable tapered
plate. The bird model was modeled as a cylindrical fluid. We
successfully identified the most influencing parameters when using
SPH in LS-DYNA. The case for 0 deg tapered plate impact shows
little bird-plate interaction because the bird is sliced in two parts and
the results are within 5% difference from the test data available in the
literature, which is an improvement over the Lagrangian model.
Conclusion: The developed SPH approach is suitable for bird-strike
events within 10% error.

Keywords:
Finite element;
Impact analysis;
Bird-strike;
Smooth-particle
hydrodynamics.

2013 Am. Trans. Eng. Appl. Sci.

*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

83
1. Introduction 
1.1 Motivation 
As we mentioned in the first paper [1], collisions between a bird and an aircraft are known as
bird-strike events. According to the Federal Aviation Administration (FAA), wildlife strikes cost
the U.S. civil aviation industry over $300 million and more than 500,000 downtime hours each
year [2].
We previously developed the Lagrangian model to predict bird-strike events [1]. However,
this description causes losses of the bird mass due to the fluid behavior of the bird, which causes
large distortions in the bird model. This mass loss may reduce the real loads applied to the fan
blade, which is the reason why the Smoothed Particle Hydrodynamics (SPH) is being studied in
this work. LS-DYNA has the capability to use SPH formulation to model this fluid-structure
interaction problem. In this work, we plan on developing a SPH standard work to modeling
bird-strike events.

1.2 Background on Impact Problems   
The impact event is not a new topic and it has been studied by various authors [3, 4, 5, and 6] .
The characterization of birds impacting a rigid plate was studied by Barber et al. [7]. They found
that peak pressures were generated in the impact of the bird against a rigid circular plate. This peak
pressures were independent of the bird size and proportional to the square of the impact velocity.
Four steps concerning the impact pressures were found: initial shock (Hugonniot Pressure), impact
shock decay, a steady state phase and the final decay of the pressure. This pressure plots were used
as a reference to compare the obtained pressures in the LS-DYNA simulation of the bird-strike
event.
Bird-strike events have been studied using Lagrangian method in different finite element
codes [8]. But we seek a model with a better correlation. As we did for the case of Lagrangian
model we will use the work by Moffat et al. [9] and Barber et al. [7] as our reference. The
geometrical model that was used for the bird was a cylinder with spherical ends with an overall
length of 15.24 cm and a diameter of 7.62 cm. The bird density is 950 kg/m3. Moffat et al. [9]
found that the pressures were insensitive to the strength of the bird and a yield stress of 3.45 MPa

84

Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
was taken for the rigid plate impact analysis. For the tapered plate impact simulation a 7.62 × 22.86
cm plate was used. The plate was tapered by 4° and the edge thickness was 0.051 cm which
blended to 0.160 cm for the majority of the plate. The work did not specify the kind of element
that was used for the tapered plate. All LS-DYNA simulation for the tapered plate were simulated
using shell elements.

1.3 Smoothed Particle Hydrodynamics 
The SPH is a meshless or griddles technique that does not suffer from the normal problems of
grid tangling in large deformation problems. The major advantages of the SPH technique is that it
does not require a numerical grid and, since it is a Lagrangian method by nature, it allows efficient
tracking of material deformations and history-dependent behavior. Because the SPH method has
not been fully developed there remain some issues in the areas of stability, consistency, and
conservation. Lagrangian motions of mass points or particles are really interpolation points, which
are approximated by a cubic B-spline function. Unlike finite element representations for a
structure, this finite element model does not exhibit a fixed connectivity between adjacent elements
during the impact event. The determination of which elements are nearest neighbors is limited by
the search radius. The search radius defines the maximum distance from the center node that an
element may search for nearest neighbors and becomes in effect a measure of the fluid cohesive
strength.
Martin [10] studied a transient, material, and geometric nonlinear finite element based impact
analysis using PW/WHAM. His work consisted in simulating soft body impact over stainless steel
disc, a deformable flat plate, and a tapered plate. The formulation employed was very similar to the
concept of the meshless finite element technique SPH. Many authors have presented basic
equations related with the SPH approach. Commonwealth Scientific & Industrial Research
Organization (CSIRO) provided the equations for the SPH approximation using the smoothing
kernel function. Lacome [11] described the conventions used for the selection of the smoothing
length. This is a very important parameter because the spatial resolution of the model depends on
the smoothing length and the characteristic length of the meshed particle. La-come [12] also
provided important information regarding the SPH process, the process of the neighbor search in
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

85
the interpolation and the SPH approximations for the equations of energy and mass conservation.
A general description of the SPH method was presented by Hut et al. [13]. The authors
presented applications of the method as well as information about the computational parameters for
the SPH method and the expectations for accelerating processing time with the implementation of
faster computers.
In this work, we attempt to create a standard work based on the SPH formulation by
identifying the most important influencing parameters in the bird-strike simulation and validate the
simulation with the test data and compare against the Lagrangian model previously developed
[1].

2. Impact Analysis 
The bird-strike events are considered as soft body impact in structural analysis because the
yield point of the bird is far smaller when compared with that of the target. Thus, the bird at the
impact can be considered as a fluid material. The soft body impact results in damage over a larger
area if compared with ballistic impacts. Let us understand the main equations involved in this
study.

2.1 A Continuum Approach   
Three major equations are solved by LS-DYNA to obtain the velocity, density, and pressure of
the fluid for a specific position and time. These equations are conservation of mass, conservation of
momentum, and constitutive relationship of the material and are essential to solve the soft body
impact problem (Cassenti [6]). The conservation of momentum can be stated as follows:

(1)
where P represents a diagonal matrix containing only normal pressure components, ρ the density,
and V the velocity vector. The conservation of mass per unit volume equation can be written as
follows:

(2)

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Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
The last equation is that of the constitutive relation and can be expressed in its general form as
follows:
(3)

2.2 SPH Approach 
Smooth Particle Hydrodynamics (SPH) formulation is a meshless Lagrangian technique used
to model the fluid equations of motion using a pseudo-particle interpolation method to compute
smooth hydrodynamic variables. Initially this method was used to simulate astrophysical
phenomenon, but recently it has been used to resolve other physics problems in continuum
mechanics, crash simulations, brittle and ductile fracture in solids. Due to the absence of a grid, this
method allows solving many problems that are hardly reproducible in other classical methods
discarding the problem of large mesh deformations or tangling. Another advantage of the SPH
method is that due to the absence of a mesh, problems with irregular geometry can be solved.

Figure 1: Integration cycle in time of the SPH computation process.
In this formulation, the fluid is represented as a set of moving particles, each one representing
an interpolation point, where all the fluid properties are known. Then, with a regular interpolation
function called smoothing length the solution of the desired quantities can be calculated for all the
particles. A real fluid can be modeled as many fluid particles provided that the particles are small
compared to the scale over which macroscopic properties of the fluid varies, but large enough to
contain many molecules so macroscopic properties can be defined sensibly. A large number of
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

87
particles are needed for the SPH calculations, since the continuum limit is recovered when the
number of particles goes to infinity. Particles in the SPH method carry information about their
hydrodynamic and thermodynamic information, this in addition to the mass needed to specify the
evolution of the fluid. Nodes in SPH are similar to nodes in a mesh, the difference is that these
nodes are continuously deformable and distort automatically to put more of the computational
effort in regions of relatively high density.
One disadvantage in SPH is that this method is computationally demanding, both in memory
and in CPU time. This can be overcome using a parallel analysis with more than one CPU. There is
also the difficulty of establishing the boundary condition when using the SPH method. Another
disadvantage is that particles may penetrate the boundaries and causing loss of smoothness and
accuracy.

Figure 2: Neighbor search particles inside a 2h radius sphere.

Figure 1 illustrates an integration cycle in time of the SPH computation process (Lacome
[12]). In the SPH analysis, it is important to know which particle will interact with its neighbors
because the interpolation depends on these interactions. Therefore, a neighboring search technique
has been developed, as shown in Figure 2 (Lacome [12]). The influence of a particle is established
inside of a sphere of radius of 2h, where h is the smoothing length In the neighboring search, it is
also important to list, for each time step, the particles that are inside that sphere. If we have N
particles, then it is required (N − 1) distance comparison. If this comparison is done for each
particle, then the total amount of comparisons will be N(N − 1). It is better to have a variable
smoothing length to avoid problems related with expansion and compression of material. The main
idea of this concept is that it is necessary to keep enough particles in the neighborhood to validate
the approximation of continuum variables. The smoothing is allowed to vary in time and space. For

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Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
a constant smoothing length, a material expansion can lead to numerical fracture and a material
compression can slow down the calculation significantly.

2.3 Material Models 
The type of materials used for the bird model was material null, which considers a fluid
material composed of 90% of water and 10% of air. This material allows consider equation of state
without computing deviatoric stresses. The equation of state used with this material was the
equation of state tabulated. This equation of state defines the pressure P as follows

For the type of impact problems studied in this work, temperature does not play a big role. In this
context, the term

The volumetric strain

vanishes and thus the equation of state reduces to

is given by the natural logarithm of the relative volume.

Figure 3: Beam impact problem.

3. Beam Centered Impact Problem 
Before studying bird-strike events, we proceeded to solve a beam centered impact problem
(Goyal and Huertas [14]). The problem consisted in taking a simply supported beam of length, L,
of 100 mm over which a rigid object of mass, mA, of 2.233g impacts at a constant initial velocity of,
(vA) 1,100 m/s. The beam has a solid squared cross section of length 4 mm, modulus of elasticity,
EB, of 205 GPa, and a density, ρB, of 3.925 kg/m3. Figure 3 shows a schematic of the problem.
The goal of this problem is to obtain the pressure maximum peak pressure exerted at the moment of
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

89
impact. The problem is solve analytically and then compared to the corresponding outputs from
LS-DYNA for the Lagrange method.

Figure 4: Beam impact problem simplification.

3.1 Analytical Solution 
Since the impact occurs at only one point, the problem can be solved by concentrating all the
mass of the beam at the point of impact, i.e., at the center of the beam. This will simplify the
problem to a problem of central impact between two masses, as shown in Figure 4. The theorem
of impulse and momentum may be divided into two parts, as shown in Figure 5. We show [1] that
the impulsive time-average constant force Fave acting during the time of the impact is found using
the following equation:
(4)
Where ∆ is the time it takes to complete the impact. Equation (4) has two unknowns: the average
force and the impact time. The impact time is taken to match the impact time given by LS-DYNA,
and thus perform a fair comparison. Once the impact time in known, the force is obtained straight
forward using Eq. (4).

Figure 5: Visualization of the theorem of impulse and momentum.

3.2 SPH Simulation 
Now we solve the problem using the SPH description in LS-DYNA. In this case the projectile
was composed of SPH particles and a large modulus of elasticity was used to model the rigid target.
Figure 6 shows the SPH simulation and Figure 7 shows the plot for the impact force. The measured

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Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
impact time was ∆ = 8.03 µs. Substituting values in Eq. 4, the analytical impact force is 29.02 kN
and the pressure as 1.161 GPa. The peak force in this SPH simulation was 27.84 kN which is 4.06%
lower than the analytical value. The pressure from the SPH method is calculated as 1.11 GPa. Thus,
there is 2.4% difference when comparing the peak force with the Lagrangian simulation to the
analytical solution. The Lagrangian model produced an impact force is 27.65kN and the pressure
1.106 GPa [1]. The values obtained with the SPH model are within 3% with those obtained using
the Lagrangian model.

Figure 6: SPH simulation of traverse beam impact.

4. Bird­Strike Impact Problem 
The beam centered impact problem was based on rigid body impact in which the analytical
load computation is relatively easily taking. The results obtained from this example provided us
confidence in the methods being used and thus we proceeded to analyze the bird-strike impact
problem. Although the bird-strike event may occur in different parts of an aircraft, the scope of
this work is to study bird-strike against fan-blades. Figure 8 shows the damage caused by bird
impact on the turbine fan blades. This only shows us that this problem is crucial and that by
predicting the impact pressure will help us design better fan blades. Furthermore, a fan blade is
composed of both flat and tapered sections. Thus, we focus our attention on analyzing bird-strikes
against flat and tapered plate using the SPH formulation in LS-DYNA. We use the work by
Barber et al. [7] as a mean of comparison. The results within 10% would be acceptable since the
actual testing model is not available.

*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

91
4.1 Preprocessing 
In order to achieve a fair comparison with the Lagrange simulations and test data, we kept the
same bird properties as in the Lagrangian case [1]. Because the SPH model is represented by a
group of elements or small spheres, and is not continuous along the whole space they are
occupying, it is necessary to calculate the physical properties for each element by taking into
account that each element should have the same bird density. It is also important to highlight that
the sum of masses of all small elements or spheres must be equal to the mass of the bird. The rigid
and tapered plates used for the SPH model have the same dimensions and properties as in the case
of the Lagrangian simulation.

Figure 7: Impact force for the SPH simulation.

Figure 8: Damage caused by bird-strikes.
4.1.1 Bird­Model 
How to model a bird is quite challenging and a model that best meets the testing bird properties
must be used. The model considered in this work is that of a cylinder, as suggested by Bowman and
Frank [15]. It has been shown that this model of bird produce close results to real birds. In

92

Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
addition, the bird model is assumed isotropic, symmetric and homogeneous. An approximate
aspect ratio (L/D) of 2.03 was used for our bird model. The dimensions vary depending on the
mass of the bird, and are selected from the test data by Barber et al. [7]. The material properties of
the bird were similar to a gelatin material with 90% water and 10% air mixture.

Figure 9: SPH Element generation for the bird model.
To model the bird, first a square mesh with equivalent sides to the pre-calculated diameter are
constructed, and then extruded to a length with different number of subdivisions, as seen in Figure
9(a). The elements located in the square mesh are eliminated to approximate the mesh shape to
that of the circular (cylindrical) mesh used in the Lagrangian simulation, as shown in Figs. 9(b) and
9(c). The remaining nodes are used to calculate the mass and dimensions of each spherical
element, and the SPH particles were constructed in each remaining node (Goyal et al. [16]). The
lumped mass for each SPH element is calculated using the following equation:
(5)
Note that the number of nodes is equal to the number SPH elements. For the shot reproduced the
dimensions of the bird (cylindrical representation) were: D = 41.4431 mm, L = 60 mm, ρ = 912.60
kg/m3, V = 80936.7 mm3, and m = 0.073863 kg. Table 1 summarizes the main properties used for
modeling the bird.
4.1.2 Rigid Flat Plate Target 
Here we used two different targets: a rigid flat plate and a deformable tapered plate. The
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

93
purpose of using a rigid flat plate target is to compare the simulations with the experimental data
obtained from Barber et al. [7]. Barber et al. [7] used a rigid flat plate for their experiments which
was modeled as a circular rigid plate with dimensions of 1 mm thickness and 15.25 cm of diameter.
The material of the target disk was 4340 steel, with a yield strength of 1035 MPa, Rockwell surface
hardness of C45, modulus of elasticity modulus of 205 GPa, and a Poisson’s ratio of 0.29. These
properties of the material will be used in LS-DYNA to model the flat rigid plate.
Table 1: Properties for the model of bird.

Table 2: Tapered plate properties (fixed at the two shortest sides).

4.1.3 Deformable Tapered Plate Target 
The deformable tapered plate target properties were taken from the work by Moffat et al. [9],
which simulated the impacting bird (as a sphere) on a tapered plate using MSC/DYTRAN
software. The properties for the tapered plate are given in Table 2.

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Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
4.1.4 Test Data for Bird­Strike Event   
Barber et al. [7] simulated the bird-strike event as a solid cylinder with dimensions that vary
depending on the mass of the bird. The birds used in the tests weigh about 100 grams and are fired
at velocities ranging from 60 to 350 m/s. To achieve a better simulation of the bird-strike event the
densities of the computer simulated bird must be calculated based on the masses of the tests and the
recommended bird cylinder-like computer model.

Figure 10: Graphical representation of Pressure Time oscillograph for shot 4992-B [7].
Here we compared the tendencies on the pressure-load curves of the computer simulations
with experimental data, and determined velocities and densities based on the mass and velocity
quantities of the test data. To have a fair comparison of the results obtained by the bird-strike
simulation using LS-DYNA and the Barber et al. [7] research it is necessary to reproduce as
accurate as possible the results displayed from the pressure transducers recording the impact event.
Because of not having the digital experimental data of the test results to be reproduced, the graphs
presented on Barber’s report are imported into MatLab to obtain approximate readings, which are
later compared with those obtained by LS-DYNA.

Figure 11: Geometric model for the Lagrangian bird and Target shell.

*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

95
The pressure plots shown in Figure 10 depict the data by Barber et al. [7] in which the loads
generated in the impact are characterized. This is done in an effort to study the loading caused by
this kind of impact in a real aircraft. All the SPH LSDYNA simulations performed in this work
were compared with this test data. It is important to identify the stages in the loading which are
observed by Barber et al. [7].
The first simulation consisted in the bird strike event against solid rigid plates as done by
Barber et al. [7]. The second simulation model was based in the work of Moffat et al. [9],
bird-strikes on tapered plates. All simulations using the SPH model are compared with their
respective available test data and the Lagrangian models (Goyal et al. [1]). Now we proceed to
explain the results obtained by the SPH model using LS-DYNA.

5. Analysis and Results 
5.1 Frontal Impact against Rigid Flat Plate 
Figure 11 shows the uniform cylindrical representation of the bird used for the Lagrangian
model and the target plate for the frontal impact of the bird. Now, we study the effect of various
contact types for the bird model composed of 8700 SPH particles. The goal is to determine the best
contact type for bird-strike modeling. The final results are compared to those obtained using the
Lagrangian simulation [1].
5.1.1 Parameter Variation for SPH Modeling 
Several simulations are performed in which the variables inside the *CONTROL_SPH card,
type of contact and number of SPH particles were changed in order to study their sensitivity on the
impact loads and pressures. For all the contacts, the flat plate was assigned as the master part and
the SPH bird as the slave part.
Here, we explain the variables that affect directly the output data for a bird-strike event
modeled in LS-DYNA using the SPH approach. The two most important parameters that
influenced the desired response are the type of contact between the SPH particles and the target
surface, and the Particle Approximation Theory (keyword: FORM inside the SPH card
*CONTROL_SPH). The contacts used for the simulations performed included only those that

96

Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
define contact between the SPH nodes to the surface of the Lagrangian target these types of
contacts are one-way contact types.

Figure 12: Snapshots at different times of deformation of the SPH bird
varying the *FORM parameter.

Figure 13: Deformation of the SPH bird for different time intervals.
The FORM parameter (Particle Approximation Theory parameter) inside the *CONTROL
SPH card can be changed and set to FORM=1 (remoralization approximation). This generates a
deformation similar to that predicted by Wilbeck and Barber [7] of the impacting cylinder reducing
the effect of bouncing of the particles when entering in contact with the target. By changing this
parameter, a bounce-off effect is produced and thus it affects the interaction of the upcoming
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
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97
particles when entering in contact with the target and the particles already in contact with it. Figure
12 illustrates the interaction for *CONTACT AUTOMATIC NODE TO SURFACE ID with
FORM=0 and FORM=1.

With FORM=1 the particles best represent the bird-strike event.

However, the maximum force obtained for FORM=1 is 0.048 MN which differs from the 0.0581
MN of the Lagrange simulation with a 17.38% of difference.
The variable NCBS (Number of Cycles Between particle Sorting) of the *CONTROL SPH
card is varied between 2 and 5. The same force at the interface surface is used for each value for the
NCBS variable. Figure 13 shows the deformation at different time intervals for the case when
NCBS is 2 and 5. The final deformation is in good agreement to that predicted by Wilbeck and
Barber [7]. There is no difference between the resultant force at the interface of the SPH bird and
the Shell Target and have a peak value of 5.4 kN. Thus, NCBS is a nonaffecting variable in the
simulation. The contact used for this simulation was *CONTACT CONSTRAINT NODE TO
SURFACE contact type.
5.1.2 Different Material NULL Models   
Many cases where ran using Material_NULL. The maximum force obtained was higher than
400% when compared with the 0.0581 MN peak force obtained using the standard Lagrangian case
for the same contact type. Now we use a solid transducer in the center of the target to measure the
pressure in that region. The material of this solid transducer was varied from *MAT_PIECE_
WISE_LINEAR_PLASTICITY to *MAT_RIGID. The contact used was *CONTACT_
CONSTRAINED_NODE_TO_SURFACE.

The behavior of the deformation of the bird

resembles the one predicted by Barber et al. (1975). This simulation did not provide acceptable
results and thus is not recommended.

Figure 14: Deformation of the SPH bird at different time intervals using a transducer.

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Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
Figure 15: Top view of the impact of the SPH particles against the transducer.
Table 3: Peak impact Pressure comparison between SPH and Lagrangian simulations.

For this simulation, we used *MAT_NULL and *CONTACT_CONSTRAINT_NODE_TO_
SURFACE. Some solid elements are created in the center of the target to simulate a transducer.
Using the area of these elements the pressure is calculated by dividing the resultant force generated
in the contact between the bird and the transducer over the area of the transducer. Figure 14 shows
the deformed SPH bird at different time intervals. Figure 15 shows the top view of the SPH
particles impacting the simulated transducer. Approximately 81 columns of SPH particles
impacted the transducer which is higher to the previous simulations. The peak force obtained in
this case was 0.0054 MN. Then, dividing this value over 144 mm2 the pressure for this simulation
was 37.23 MPa (5409.7 psi) which was 7.05% lower than the 40 MPa (5801.2 psi) measured by
Barber et al. for shot 5126A. The pressure comparison for different SPH simulation with test data
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
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99
and the Lagrangian case is shown in Table 3. Thus, for a constant contact for the simulations
performed when the number of SPH particles was increased, the maximum pressure value obtained
from the simulation also increased. All the pressures were calculated using the approximate area
measured at the time in which the peak force occurs for each simulation.

Figure 16: SPH simulations of shot 5126 A for different number of particles.
Figure 16 shows different deformation plots for SPH simulations using different number of
particles in the model. As explained, this variation in number is considered in order to study its
influence in the stability of the model, in the deformation and in the resultant force plot along the
whole simulation. The simulation obtained with 2464 particles was unstable, which could be
caused by the non-uniform distribution of the particles across the entire model of the bird. All the
other models were constructed with a more uniform distribution of the particles and with a distance
between adjacent particles almost constant. These models produced deformations close to
experimental data. Models with 4700, 8700 and 22,000 SPH particles showed deformation with a
sliding behavior in the steady phase of the impact. In contrast, models using 5000 and 10000 SPH
particles presented bouncing of the particles in the steady phase of the bird-strike. However this

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Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
bouncing effect is more affected by the type of contact used than for the amount of SPH particles
used for the creation of the model, as shown in Figure 17.

Figure 17: Peak force for SPH simulations of shot 5126 A.

Figure 18: Comparison of peak pressure obtained in Lagrangian and SPH simulation using the
nodes to surface contact TEROD=1.1.
Figure 18 shows that the *CONTACT_ERODING_NODE_TO_SURFACE and the in the
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

101
*CONTACT_NODE_TO_SURFACE simulation with 8,700 particles have a peak pressure close
to the peak pressure obtained in the Lagrangian simulation. These contact types are then one of the
indicated to be used in SPH simulation of bird-strike because of its capability of reproduce the
loads in the impact close to the Lagrange model and to the test data.
Using the results obtained it is observed that the mesh density affects the simulation.
Simulated transducers make possible getting the pressure distribution graph. When two different
mesh resolutions are used, the results are more accurate with respect to the maximum pressure
obtained.

5.2 Impact for a Tapered Plate (Impact at 0 deg) 
Using the previous framework, we considered two different bird impact angles: 0 and 30
degrees. The dimension and properties of the tapered plate are identical to those of previous
simulations. The number of SPH particles created for this simulation was 26195 and its distribution
was arranged to form the cylinder.

Figure 19: Result of the interaction for the SPH simulation of the tapered plate impact using
material NULL.
Table 4: Peak force comparison for various SPH tapered plate impact at 0 degrees.

102

Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
When using Material NULL, little or no interaction between the tapered plate and the bird is
observed, suggesting that the bird is sliced in two parts. This is the same behavior observed in the
Lagrangian approach. Only few particles are involved in the impact for the SPH simulation. The
results for the 0 degrees of impact simulation show that there is an only slight deformation in the
tapered plate. Figure 19 shows that the particles aligned with the plate were the ones suffering
deflection while the other particles continued their trajectory.
When using elastic fluid material, there was interaction of the plate and the bird, but as the
impact is a 0 degrees the plate slices the bird in two parts. This occurs because the bird impacts at
the narrowest side of the plate. Figure 19 shows that the maximum peak force computed for this
case was 0.001694 MN. This force is 88.66% lower than the computed for the Lagrangian case.
One reason for this is that the elastic fluid accounts for the deviatoric stresses, computing the
stresses that cause deformation in the solid elements of the bird. The impact energy therefore will
be absorbed for the material of the bird, decreasing the force generated in the impact. Table 4 lists
the peak forces obtained for the Lagrange and SPH simulations of the bird-strike on tapered plates
impacting at an angle of 0 degrees. The simulation that best converges to the Lagrangian case is
the SPH simulation using the material null for a SPH model with 26,000 particles.

Figure 20: Result of the interaction for the SPH simulation of the tapered plate.

5.3 Impact for a Tapered Plate (Impact at 30 deg) 
Now we explain the simulation of a cylindrical bird impacting a tapered plate along the
thinnest side. The deflection of the leading edge and the loads generated in the impact were
computed for LS-DYNA. The type of material was the *MAT_NULL. Figure 21 shows the
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

103
deformation of the tapered plate at different times of the simulation. In this case, the maximum
normal deflection was 1.12 inches which was 6.96% higher than the value obtained by Moffat et al.
[9]. The maximum value of the force had a value of 0.049 MN, 13.46% lower than the 0.0566 MN
in the Lagrange simulation of the same impact which shows that a good convergence both for force
and deflection occurs in this simulation.

Figure 21: Deformation of the tapered plate using material null using SPH model.
Table 5: Maximum normal deflection for a bird impacting a tapered plate at 30°.

Other cases where also ran and results are enclosed in Table 5. Thus, the simulation that has
better convergence to the maximum deflection found by Moffat is the SPH simulation using
material null and 26,000 particles. In addition, for this model the peak force obtained was only
13.4% different from the one calculated using the Lagrange simulation with material elastic fluid.
But if the peak force is compared with the Lagrangian case using the same null material the error is
8.93%. However, changing the material in the SPH simulation to the material elastic fluid does not
result in a convergence of the force to the Lagrangian model using the same elastic fluid material.

104

Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
6. Final Remarks 
After studying the influence of various parameters involved in the SPH bird model, we
compared the peak pressure and we are ready to make some recommendation on when is it best to
use this approach. First and foremost, the SPH bird model is far more complex than the Lagrangian
bird model and the number of variables influencing the SPH model is higher than for the
Lagrangian one. For the SPH bird model, the mesh density or number of particles included has a
strong influence in the peak impact pressure. This causes the selection of an optimum number of
particles before beginning further simulations.
For the first case, the frontal impact against a flat rigid plate, a bird model with 8700 particles
with one-way constraint contact type and a null material type can be used. The error obtained in the
pressure after comparing with the experimental data is within 10%. For the Lagrangian model the
error when using elastic fluid material and an eroding contact type produced and error of 9%.
Therefore, the SPH model can successfully be used in this kind of frontal impacts.
For the second case, 0 and 30 degrees impact against a tapered plate, the SPH model validates
the results obtained in the literature. The SPH model is recommended over the Lagrangian model
for angled impacts on tapered plates since the error of the maximum normal deflection in less than
7% when compared with the experimental data available in literature. These results are validated
using 26,000 SPH particles, a eroding contact type and a null material. For the 0 degree impact,
neither the Lagrangian nor the SPH provide any significant deformation. Results show very little
interaction between the bird and the tapered plate because the bird is being sliced in two parts,
being the null material the best approximation when using SPH.
Based on the results, the SPH method can be considered as a good alternative to simulate
bird-strike events although it is more complex in the model creation.

7. Acknowledgments 
This work was performed under the grant number 24108 from the United Technologies Co.,
*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

105
Pratt & Whitney. The authors gratefully acknowledge the grant monitors for providing the
necessary computational resources and support for this work. The research presented herein is an
extension of the work presented at the 47th AIAA/ASME/ACE/AHS/ASC SDM Conference,
Rhode Island, May 2006, AIAA.

8. References 
[1] V. K. Goyal, C. A. Huertas, T. J. Vasko, 2013. Bird-Strike Modeling Based on the Lagrangian
Formulation Using LS-DYNA. Am. Trans. Eng. Appl. Sci. 2(2): 057-081. Available at:
http://TuEngr.com/ATEAS/V02/057-081.pdf. Accessed: March 2013.
[2] J. Metrisin, B. Potter, Simulating Bird Strike Damage in Jet Engines, ANSYS Solutions 3 (4)
(2001) 8–9.
[3] E. Parkes, “The permanent deformation of a cantilever strucks transversely at its tip”, in:
Proceedings Roy. Soc. Lond., England, 1995.
[4] W. J. Stronge, T. Yu, Dynamic Models for Structural Plasticity, Springer-Verlag, London,
Great Britain, 1993.
[5] W. Goldsmith, IMPACT: The Theory and Phisical Behaviour of Colliding Solids, Dover
Publications, Mineola, New York, 2001.
[6] B. N. Cassenti, Hugoniot Pressure Loading in Soft Body Impacts.
[7] J. P. Barber, H. R. Taylor, J. S. Wilbeck, “Characterization of Bird Impacts on a Rigid Plate:
Part 1”, Technical report AFFDL-TR-75-5, Air Force Flight Dynamics Laboratory,
Wright-Patterson Air Force Base, OH (1975).
[8] E. Niering, Simulation of Bird Strikes on Turbine Engines.
[9] W. Moffat, Timothy J. and Cleghorn, “Prediction of Bird Impact Pressures and Damage Using
MSC/DYTRAN”, in: Proceedings of ASME TURBOEXPO, Louisiana, 2001.
[10] N. F. Martin, Nonlinear Finite Element Analysis to Predict Fan Blade Impact Damage.
[11] J. Lacome, “Smooth Particle Hydrodynamics (SPH): A New Feature in LS-DYNA”, in:
Proceedings of the 6th International LS-DYNA Users Conference, 2000.
[12] J. Lacome, Smooth Particle Hydrodynamics-Part II (2001) 6–11.
[13] L. H. Hut, P., G. Lake, S. M. J. Makino, T. Sterling, “Smooth Particle Hydrodynamics:
Models, Applications, and Enabling Technologies”, in: Proceedings form the Workshop
Presented by the Institute for Advance Study, Princeton., 1997.
[14] V. K. a. C. A. H. Goyal, “Robust Bird-Strike Modeling Using LS-DYNA”, in: Proceeding of

106

Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
the 23th Southeastern Conference on Theoretical and Applied Mechanics Conference,
Mayaguez, Puerto Rico., 2006.
[15] D. R. Bowman, G. J. Frank, “IBRG ARTIFICIAL BIRD PROJECT”, Work programmed and
Schedule, United Kingdom (2000).

Dr. V. Goyal is an associate professor committed to develop a strong sponsored research program for
aerospace, automotive, biomechanical and naval structures by advancing modern computational
methods and creating new ones, establishing state-of-the-art testing laboratories, and teaching
courses for undergraduate and graduate programs. Dr. Goyal, US citizen and fully bilingual in both
English and Spanish, has over 17 years of experience in advanced computational methods applied to
structures. He has over 15 technical publications with another three in the pipeline, author of two
books (Aircraft Structures for Engineers and Finite Element Analysis) and has been recipient of
several research grants from Lockheed Martin Co., ONR, and Pratt & Whitney.
C. Huertas completed his master’s degree at University of Puerto Rico at Mayagüez in 2006.
Currently, his is back to his home town in Peru working as an engineer.

Dr. Thomas J. Vasko, Assistant Professor, joined the Department of Engineering at Central
Connecticut State University in the fall 2008 semester after 31 years with United Technologies
Corporation (UTC), where he was a Pratt & Whitney Fellow in Computational Structural
Mechanics. While at UTC, Vasko held adjunct instructor faculty positions at the University of
Hartford and RPI Groton. He holds a Ph.D. in M.E. from the University of Connecticut, an M.S.M.E.
from RPI, and a B.S.M.E. from Lehigh University. He is a licensed Professional Engineer in
Connecticut and he is on the Board of Directors of the Connecticut Society of Professional Engineers

Peer Review: This article has been internationally peer-reviewed and accepted for
publication according to the guidelines given at the journal’s website.

*Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail:
2013. American Transactions on Engineering & Applied Sciences.
vijay.goyal@upr.edu.
Volume 2 No. 2
ISSN 2229-1652 eISSN 2229-1660
Online Available at
http://TuEngr.com/ATEAS/V02/083-107.pdf

107

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Smooth Particle Hydrodynamics for Bird-Strike Analysis Using LS-DYNA

  • 1. 2013 American Transactions on Engineering & Applied Sciences. American Transactions on Engineering & Applied Sciences http://TuEngr.com/ATEAS Smooth Particle Hydrodynamics for Bird­Strike  Analysis Using LS­DYNA  Vijay K. Goyal a b a* a , Carlos A. Huertas , Thomas J. Vasko b Department of Mechanical Engineering, University of Puerto Rico at Mayagüez, PR 00680, USA Engineering Department, Central Connecticut State University, New Britain, CT 06050, USA ARTICLEINFO A B S T RA C T Article history: Received December 23, 2012 Received in revised form 24 February 2013 Accepted February 26, 2013 Available online March 04, 2013 In this second of a three-paper sequence, we developed a standard work using the Smoothed Particle Hydrodynamic (SPH) approach in LS-DYNA and compared the results against those the Lagrangian model and available experimental results. First, the SPH model was validated against a one-dimensional beam centered impact’s analytical solution and the results are within 3% error. Bird-strike events were divided into three separate problems: frontal impact on rigid flat plate, 0 and 30 deg impact on deformable tapered plate. The bird model was modeled as a cylindrical fluid. We successfully identified the most influencing parameters when using SPH in LS-DYNA. The case for 0 deg tapered plate impact shows little bird-plate interaction because the bird is sliced in two parts and the results are within 5% difference from the test data available in the literature, which is an improvement over the Lagrangian model. Conclusion: The developed SPH approach is suitable for bird-strike events within 10% error. Keywords: Finite element; Impact analysis; Bird-strike; Smooth-particle hydrodynamics. 2013 Am. Trans. Eng. Appl. Sci. *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 83
  • 2. 1. Introduction  1.1 Motivation  As we mentioned in the first paper [1], collisions between a bird and an aircraft are known as bird-strike events. According to the Federal Aviation Administration (FAA), wildlife strikes cost the U.S. civil aviation industry over $300 million and more than 500,000 downtime hours each year [2]. We previously developed the Lagrangian model to predict bird-strike events [1]. However, this description causes losses of the bird mass due to the fluid behavior of the bird, which causes large distortions in the bird model. This mass loss may reduce the real loads applied to the fan blade, which is the reason why the Smoothed Particle Hydrodynamics (SPH) is being studied in this work. LS-DYNA has the capability to use SPH formulation to model this fluid-structure interaction problem. In this work, we plan on developing a SPH standard work to modeling bird-strike events. 1.2 Background on Impact Problems    The impact event is not a new topic and it has been studied by various authors [3, 4, 5, and 6] . The characterization of birds impacting a rigid plate was studied by Barber et al. [7]. They found that peak pressures were generated in the impact of the bird against a rigid circular plate. This peak pressures were independent of the bird size and proportional to the square of the impact velocity. Four steps concerning the impact pressures were found: initial shock (Hugonniot Pressure), impact shock decay, a steady state phase and the final decay of the pressure. This pressure plots were used as a reference to compare the obtained pressures in the LS-DYNA simulation of the bird-strike event. Bird-strike events have been studied using Lagrangian method in different finite element codes [8]. But we seek a model with a better correlation. As we did for the case of Lagrangian model we will use the work by Moffat et al. [9] and Barber et al. [7] as our reference. The geometrical model that was used for the bird was a cylinder with spherical ends with an overall length of 15.24 cm and a diameter of 7.62 cm. The bird density is 950 kg/m3. Moffat et al. [9] found that the pressures were insensitive to the strength of the bird and a yield stress of 3.45 MPa 84 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 3. was taken for the rigid plate impact analysis. For the tapered plate impact simulation a 7.62 × 22.86 cm plate was used. The plate was tapered by 4° and the edge thickness was 0.051 cm which blended to 0.160 cm for the majority of the plate. The work did not specify the kind of element that was used for the tapered plate. All LS-DYNA simulation for the tapered plate were simulated using shell elements. 1.3 Smoothed Particle Hydrodynamics  The SPH is a meshless or griddles technique that does not suffer from the normal problems of grid tangling in large deformation problems. The major advantages of the SPH technique is that it does not require a numerical grid and, since it is a Lagrangian method by nature, it allows efficient tracking of material deformations and history-dependent behavior. Because the SPH method has not been fully developed there remain some issues in the areas of stability, consistency, and conservation. Lagrangian motions of mass points or particles are really interpolation points, which are approximated by a cubic B-spline function. Unlike finite element representations for a structure, this finite element model does not exhibit a fixed connectivity between adjacent elements during the impact event. The determination of which elements are nearest neighbors is limited by the search radius. The search radius defines the maximum distance from the center node that an element may search for nearest neighbors and becomes in effect a measure of the fluid cohesive strength. Martin [10] studied a transient, material, and geometric nonlinear finite element based impact analysis using PW/WHAM. His work consisted in simulating soft body impact over stainless steel disc, a deformable flat plate, and a tapered plate. The formulation employed was very similar to the concept of the meshless finite element technique SPH. Many authors have presented basic equations related with the SPH approach. Commonwealth Scientific & Industrial Research Organization (CSIRO) provided the equations for the SPH approximation using the smoothing kernel function. Lacome [11] described the conventions used for the selection of the smoothing length. This is a very important parameter because the spatial resolution of the model depends on the smoothing length and the characteristic length of the meshed particle. La-come [12] also provided important information regarding the SPH process, the process of the neighbor search in *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 85
  • 4. the interpolation and the SPH approximations for the equations of energy and mass conservation. A general description of the SPH method was presented by Hut et al. [13]. The authors presented applications of the method as well as information about the computational parameters for the SPH method and the expectations for accelerating processing time with the implementation of faster computers. In this work, we attempt to create a standard work based on the SPH formulation by identifying the most important influencing parameters in the bird-strike simulation and validate the simulation with the test data and compare against the Lagrangian model previously developed [1]. 2. Impact Analysis  The bird-strike events are considered as soft body impact in structural analysis because the yield point of the bird is far smaller when compared with that of the target. Thus, the bird at the impact can be considered as a fluid material. The soft body impact results in damage over a larger area if compared with ballistic impacts. Let us understand the main equations involved in this study. 2.1 A Continuum Approach    Three major equations are solved by LS-DYNA to obtain the velocity, density, and pressure of the fluid for a specific position and time. These equations are conservation of mass, conservation of momentum, and constitutive relationship of the material and are essential to solve the soft body impact problem (Cassenti [6]). The conservation of momentum can be stated as follows: (1) where P represents a diagonal matrix containing only normal pressure components, ρ the density, and V the velocity vector. The conservation of mass per unit volume equation can be written as follows: (2) 86 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 5. The last equation is that of the constitutive relation and can be expressed in its general form as follows: (3) 2.2 SPH Approach  Smooth Particle Hydrodynamics (SPH) formulation is a meshless Lagrangian technique used to model the fluid equations of motion using a pseudo-particle interpolation method to compute smooth hydrodynamic variables. Initially this method was used to simulate astrophysical phenomenon, but recently it has been used to resolve other physics problems in continuum mechanics, crash simulations, brittle and ductile fracture in solids. Due to the absence of a grid, this method allows solving many problems that are hardly reproducible in other classical methods discarding the problem of large mesh deformations or tangling. Another advantage of the SPH method is that due to the absence of a mesh, problems with irregular geometry can be solved. Figure 1: Integration cycle in time of the SPH computation process. In this formulation, the fluid is represented as a set of moving particles, each one representing an interpolation point, where all the fluid properties are known. Then, with a regular interpolation function called smoothing length the solution of the desired quantities can be calculated for all the particles. A real fluid can be modeled as many fluid particles provided that the particles are small compared to the scale over which macroscopic properties of the fluid varies, but large enough to contain many molecules so macroscopic properties can be defined sensibly. A large number of *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 87
  • 6. particles are needed for the SPH calculations, since the continuum limit is recovered when the number of particles goes to infinity. Particles in the SPH method carry information about their hydrodynamic and thermodynamic information, this in addition to the mass needed to specify the evolution of the fluid. Nodes in SPH are similar to nodes in a mesh, the difference is that these nodes are continuously deformable and distort automatically to put more of the computational effort in regions of relatively high density. One disadvantage in SPH is that this method is computationally demanding, both in memory and in CPU time. This can be overcome using a parallel analysis with more than one CPU. There is also the difficulty of establishing the boundary condition when using the SPH method. Another disadvantage is that particles may penetrate the boundaries and causing loss of smoothness and accuracy. Figure 2: Neighbor search particles inside a 2h radius sphere. Figure 1 illustrates an integration cycle in time of the SPH computation process (Lacome [12]). In the SPH analysis, it is important to know which particle will interact with its neighbors because the interpolation depends on these interactions. Therefore, a neighboring search technique has been developed, as shown in Figure 2 (Lacome [12]). The influence of a particle is established inside of a sphere of radius of 2h, where h is the smoothing length In the neighboring search, it is also important to list, for each time step, the particles that are inside that sphere. If we have N particles, then it is required (N − 1) distance comparison. If this comparison is done for each particle, then the total amount of comparisons will be N(N − 1). It is better to have a variable smoothing length to avoid problems related with expansion and compression of material. The main idea of this concept is that it is necessary to keep enough particles in the neighborhood to validate the approximation of continuum variables. The smoothing is allowed to vary in time and space. For 88 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 7. a constant smoothing length, a material expansion can lead to numerical fracture and a material compression can slow down the calculation significantly. 2.3 Material Models  The type of materials used for the bird model was material null, which considers a fluid material composed of 90% of water and 10% of air. This material allows consider equation of state without computing deviatoric stresses. The equation of state used with this material was the equation of state tabulated. This equation of state defines the pressure P as follows For the type of impact problems studied in this work, temperature does not play a big role. In this context, the term The volumetric strain vanishes and thus the equation of state reduces to is given by the natural logarithm of the relative volume. Figure 3: Beam impact problem. 3. Beam Centered Impact Problem  Before studying bird-strike events, we proceeded to solve a beam centered impact problem (Goyal and Huertas [14]). The problem consisted in taking a simply supported beam of length, L, of 100 mm over which a rigid object of mass, mA, of 2.233g impacts at a constant initial velocity of, (vA) 1,100 m/s. The beam has a solid squared cross section of length 4 mm, modulus of elasticity, EB, of 205 GPa, and a density, ρB, of 3.925 kg/m3. Figure 3 shows a schematic of the problem. The goal of this problem is to obtain the pressure maximum peak pressure exerted at the moment of *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 89
  • 8. impact. The problem is solve analytically and then compared to the corresponding outputs from LS-DYNA for the Lagrange method. Figure 4: Beam impact problem simplification. 3.1 Analytical Solution  Since the impact occurs at only one point, the problem can be solved by concentrating all the mass of the beam at the point of impact, i.e., at the center of the beam. This will simplify the problem to a problem of central impact between two masses, as shown in Figure 4. The theorem of impulse and momentum may be divided into two parts, as shown in Figure 5. We show [1] that the impulsive time-average constant force Fave acting during the time of the impact is found using the following equation: (4) Where ∆ is the time it takes to complete the impact. Equation (4) has two unknowns: the average force and the impact time. The impact time is taken to match the impact time given by LS-DYNA, and thus perform a fair comparison. Once the impact time in known, the force is obtained straight forward using Eq. (4). Figure 5: Visualization of the theorem of impulse and momentum. 3.2 SPH Simulation  Now we solve the problem using the SPH description in LS-DYNA. In this case the projectile was composed of SPH particles and a large modulus of elasticity was used to model the rigid target. Figure 6 shows the SPH simulation and Figure 7 shows the plot for the impact force. The measured 90 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 9. impact time was ∆ = 8.03 µs. Substituting values in Eq. 4, the analytical impact force is 29.02 kN and the pressure as 1.161 GPa. The peak force in this SPH simulation was 27.84 kN which is 4.06% lower than the analytical value. The pressure from the SPH method is calculated as 1.11 GPa. Thus, there is 2.4% difference when comparing the peak force with the Lagrangian simulation to the analytical solution. The Lagrangian model produced an impact force is 27.65kN and the pressure 1.106 GPa [1]. The values obtained with the SPH model are within 3% with those obtained using the Lagrangian model. Figure 6: SPH simulation of traverse beam impact. 4. Bird­Strike Impact Problem  The beam centered impact problem was based on rigid body impact in which the analytical load computation is relatively easily taking. The results obtained from this example provided us confidence in the methods being used and thus we proceeded to analyze the bird-strike impact problem. Although the bird-strike event may occur in different parts of an aircraft, the scope of this work is to study bird-strike against fan-blades. Figure 8 shows the damage caused by bird impact on the turbine fan blades. This only shows us that this problem is crucial and that by predicting the impact pressure will help us design better fan blades. Furthermore, a fan blade is composed of both flat and tapered sections. Thus, we focus our attention on analyzing bird-strikes against flat and tapered plate using the SPH formulation in LS-DYNA. We use the work by Barber et al. [7] as a mean of comparison. The results within 10% would be acceptable since the actual testing model is not available. *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 91
  • 10. 4.1 Preprocessing  In order to achieve a fair comparison with the Lagrange simulations and test data, we kept the same bird properties as in the Lagrangian case [1]. Because the SPH model is represented by a group of elements or small spheres, and is not continuous along the whole space they are occupying, it is necessary to calculate the physical properties for each element by taking into account that each element should have the same bird density. It is also important to highlight that the sum of masses of all small elements or spheres must be equal to the mass of the bird. The rigid and tapered plates used for the SPH model have the same dimensions and properties as in the case of the Lagrangian simulation. Figure 7: Impact force for the SPH simulation. Figure 8: Damage caused by bird-strikes. 4.1.1 Bird­Model  How to model a bird is quite challenging and a model that best meets the testing bird properties must be used. The model considered in this work is that of a cylinder, as suggested by Bowman and Frank [15]. It has been shown that this model of bird produce close results to real birds. In 92 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 11. addition, the bird model is assumed isotropic, symmetric and homogeneous. An approximate aspect ratio (L/D) of 2.03 was used for our bird model. The dimensions vary depending on the mass of the bird, and are selected from the test data by Barber et al. [7]. The material properties of the bird were similar to a gelatin material with 90% water and 10% air mixture. Figure 9: SPH Element generation for the bird model. To model the bird, first a square mesh with equivalent sides to the pre-calculated diameter are constructed, and then extruded to a length with different number of subdivisions, as seen in Figure 9(a). The elements located in the square mesh are eliminated to approximate the mesh shape to that of the circular (cylindrical) mesh used in the Lagrangian simulation, as shown in Figs. 9(b) and 9(c). The remaining nodes are used to calculate the mass and dimensions of each spherical element, and the SPH particles were constructed in each remaining node (Goyal et al. [16]). The lumped mass for each SPH element is calculated using the following equation: (5) Note that the number of nodes is equal to the number SPH elements. For the shot reproduced the dimensions of the bird (cylindrical representation) were: D = 41.4431 mm, L = 60 mm, ρ = 912.60 kg/m3, V = 80936.7 mm3, and m = 0.073863 kg. Table 1 summarizes the main properties used for modeling the bird. 4.1.2 Rigid Flat Plate Target  Here we used two different targets: a rigid flat plate and a deformable tapered plate. The *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 93
  • 12. purpose of using a rigid flat plate target is to compare the simulations with the experimental data obtained from Barber et al. [7]. Barber et al. [7] used a rigid flat plate for their experiments which was modeled as a circular rigid plate with dimensions of 1 mm thickness and 15.25 cm of diameter. The material of the target disk was 4340 steel, with a yield strength of 1035 MPa, Rockwell surface hardness of C45, modulus of elasticity modulus of 205 GPa, and a Poisson’s ratio of 0.29. These properties of the material will be used in LS-DYNA to model the flat rigid plate. Table 1: Properties for the model of bird. Table 2: Tapered plate properties (fixed at the two shortest sides). 4.1.3 Deformable Tapered Plate Target  The deformable tapered plate target properties were taken from the work by Moffat et al. [9], which simulated the impacting bird (as a sphere) on a tapered plate using MSC/DYTRAN software. The properties for the tapered plate are given in Table 2. 94 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 13. 4.1.4 Test Data for Bird­Strike Event    Barber et al. [7] simulated the bird-strike event as a solid cylinder with dimensions that vary depending on the mass of the bird. The birds used in the tests weigh about 100 grams and are fired at velocities ranging from 60 to 350 m/s. To achieve a better simulation of the bird-strike event the densities of the computer simulated bird must be calculated based on the masses of the tests and the recommended bird cylinder-like computer model. Figure 10: Graphical representation of Pressure Time oscillograph for shot 4992-B [7]. Here we compared the tendencies on the pressure-load curves of the computer simulations with experimental data, and determined velocities and densities based on the mass and velocity quantities of the test data. To have a fair comparison of the results obtained by the bird-strike simulation using LS-DYNA and the Barber et al. [7] research it is necessary to reproduce as accurate as possible the results displayed from the pressure transducers recording the impact event. Because of not having the digital experimental data of the test results to be reproduced, the graphs presented on Barber’s report are imported into MatLab to obtain approximate readings, which are later compared with those obtained by LS-DYNA. Figure 11: Geometric model for the Lagrangian bird and Target shell. *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 95
  • 14. The pressure plots shown in Figure 10 depict the data by Barber et al. [7] in which the loads generated in the impact are characterized. This is done in an effort to study the loading caused by this kind of impact in a real aircraft. All the SPH LSDYNA simulations performed in this work were compared with this test data. It is important to identify the stages in the loading which are observed by Barber et al. [7]. The first simulation consisted in the bird strike event against solid rigid plates as done by Barber et al. [7]. The second simulation model was based in the work of Moffat et al. [9], bird-strikes on tapered plates. All simulations using the SPH model are compared with their respective available test data and the Lagrangian models (Goyal et al. [1]). Now we proceed to explain the results obtained by the SPH model using LS-DYNA. 5. Analysis and Results  5.1 Frontal Impact against Rigid Flat Plate  Figure 11 shows the uniform cylindrical representation of the bird used for the Lagrangian model and the target plate for the frontal impact of the bird. Now, we study the effect of various contact types for the bird model composed of 8700 SPH particles. The goal is to determine the best contact type for bird-strike modeling. The final results are compared to those obtained using the Lagrangian simulation [1]. 5.1.1 Parameter Variation for SPH Modeling  Several simulations are performed in which the variables inside the *CONTROL_SPH card, type of contact and number of SPH particles were changed in order to study their sensitivity on the impact loads and pressures. For all the contacts, the flat plate was assigned as the master part and the SPH bird as the slave part. Here, we explain the variables that affect directly the output data for a bird-strike event modeled in LS-DYNA using the SPH approach. The two most important parameters that influenced the desired response are the type of contact between the SPH particles and the target surface, and the Particle Approximation Theory (keyword: FORM inside the SPH card *CONTROL_SPH). The contacts used for the simulations performed included only those that 96 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 15. define contact between the SPH nodes to the surface of the Lagrangian target these types of contacts are one-way contact types. Figure 12: Snapshots at different times of deformation of the SPH bird varying the *FORM parameter. Figure 13: Deformation of the SPH bird for different time intervals. The FORM parameter (Particle Approximation Theory parameter) inside the *CONTROL SPH card can be changed and set to FORM=1 (remoralization approximation). This generates a deformation similar to that predicted by Wilbeck and Barber [7] of the impacting cylinder reducing the effect of bouncing of the particles when entering in contact with the target. By changing this parameter, a bounce-off effect is produced and thus it affects the interaction of the upcoming *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 97
  • 16. particles when entering in contact with the target and the particles already in contact with it. Figure 12 illustrates the interaction for *CONTACT AUTOMATIC NODE TO SURFACE ID with FORM=0 and FORM=1. With FORM=1 the particles best represent the bird-strike event. However, the maximum force obtained for FORM=1 is 0.048 MN which differs from the 0.0581 MN of the Lagrange simulation with a 17.38% of difference. The variable NCBS (Number of Cycles Between particle Sorting) of the *CONTROL SPH card is varied between 2 and 5. The same force at the interface surface is used for each value for the NCBS variable. Figure 13 shows the deformation at different time intervals for the case when NCBS is 2 and 5. The final deformation is in good agreement to that predicted by Wilbeck and Barber [7]. There is no difference between the resultant force at the interface of the SPH bird and the Shell Target and have a peak value of 5.4 kN. Thus, NCBS is a nonaffecting variable in the simulation. The contact used for this simulation was *CONTACT CONSTRAINT NODE TO SURFACE contact type. 5.1.2 Different Material NULL Models    Many cases where ran using Material_NULL. The maximum force obtained was higher than 400% when compared with the 0.0581 MN peak force obtained using the standard Lagrangian case for the same contact type. Now we use a solid transducer in the center of the target to measure the pressure in that region. The material of this solid transducer was varied from *MAT_PIECE_ WISE_LINEAR_PLASTICITY to *MAT_RIGID. The contact used was *CONTACT_ CONSTRAINED_NODE_TO_SURFACE. The behavior of the deformation of the bird resembles the one predicted by Barber et al. (1975). This simulation did not provide acceptable results and thus is not recommended. Figure 14: Deformation of the SPH bird at different time intervals using a transducer. 98 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 17. Figure 15: Top view of the impact of the SPH particles against the transducer. Table 3: Peak impact Pressure comparison between SPH and Lagrangian simulations. For this simulation, we used *MAT_NULL and *CONTACT_CONSTRAINT_NODE_TO_ SURFACE. Some solid elements are created in the center of the target to simulate a transducer. Using the area of these elements the pressure is calculated by dividing the resultant force generated in the contact between the bird and the transducer over the area of the transducer. Figure 14 shows the deformed SPH bird at different time intervals. Figure 15 shows the top view of the SPH particles impacting the simulated transducer. Approximately 81 columns of SPH particles impacted the transducer which is higher to the previous simulations. The peak force obtained in this case was 0.0054 MN. Then, dividing this value over 144 mm2 the pressure for this simulation was 37.23 MPa (5409.7 psi) which was 7.05% lower than the 40 MPa (5801.2 psi) measured by Barber et al. for shot 5126A. The pressure comparison for different SPH simulation with test data *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 99
  • 18. and the Lagrangian case is shown in Table 3. Thus, for a constant contact for the simulations performed when the number of SPH particles was increased, the maximum pressure value obtained from the simulation also increased. All the pressures were calculated using the approximate area measured at the time in which the peak force occurs for each simulation. Figure 16: SPH simulations of shot 5126 A for different number of particles. Figure 16 shows different deformation plots for SPH simulations using different number of particles in the model. As explained, this variation in number is considered in order to study its influence in the stability of the model, in the deformation and in the resultant force plot along the whole simulation. The simulation obtained with 2464 particles was unstable, which could be caused by the non-uniform distribution of the particles across the entire model of the bird. All the other models were constructed with a more uniform distribution of the particles and with a distance between adjacent particles almost constant. These models produced deformations close to experimental data. Models with 4700, 8700 and 22,000 SPH particles showed deformation with a sliding behavior in the steady phase of the impact. In contrast, models using 5000 and 10000 SPH particles presented bouncing of the particles in the steady phase of the bird-strike. However this 100 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 19. bouncing effect is more affected by the type of contact used than for the amount of SPH particles used for the creation of the model, as shown in Figure 17. Figure 17: Peak force for SPH simulations of shot 5126 A. Figure 18: Comparison of peak pressure obtained in Lagrangian and SPH simulation using the nodes to surface contact TEROD=1.1. Figure 18 shows that the *CONTACT_ERODING_NODE_TO_SURFACE and the in the *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 101
  • 20. *CONTACT_NODE_TO_SURFACE simulation with 8,700 particles have a peak pressure close to the peak pressure obtained in the Lagrangian simulation. These contact types are then one of the indicated to be used in SPH simulation of bird-strike because of its capability of reproduce the loads in the impact close to the Lagrange model and to the test data. Using the results obtained it is observed that the mesh density affects the simulation. Simulated transducers make possible getting the pressure distribution graph. When two different mesh resolutions are used, the results are more accurate with respect to the maximum pressure obtained. 5.2 Impact for a Tapered Plate (Impact at 0 deg)  Using the previous framework, we considered two different bird impact angles: 0 and 30 degrees. The dimension and properties of the tapered plate are identical to those of previous simulations. The number of SPH particles created for this simulation was 26195 and its distribution was arranged to form the cylinder. Figure 19: Result of the interaction for the SPH simulation of the tapered plate impact using material NULL. Table 4: Peak force comparison for various SPH tapered plate impact at 0 degrees. 102 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 21. When using Material NULL, little or no interaction between the tapered plate and the bird is observed, suggesting that the bird is sliced in two parts. This is the same behavior observed in the Lagrangian approach. Only few particles are involved in the impact for the SPH simulation. The results for the 0 degrees of impact simulation show that there is an only slight deformation in the tapered plate. Figure 19 shows that the particles aligned with the plate were the ones suffering deflection while the other particles continued their trajectory. When using elastic fluid material, there was interaction of the plate and the bird, but as the impact is a 0 degrees the plate slices the bird in two parts. This occurs because the bird impacts at the narrowest side of the plate. Figure 19 shows that the maximum peak force computed for this case was 0.001694 MN. This force is 88.66% lower than the computed for the Lagrangian case. One reason for this is that the elastic fluid accounts for the deviatoric stresses, computing the stresses that cause deformation in the solid elements of the bird. The impact energy therefore will be absorbed for the material of the bird, decreasing the force generated in the impact. Table 4 lists the peak forces obtained for the Lagrange and SPH simulations of the bird-strike on tapered plates impacting at an angle of 0 degrees. The simulation that best converges to the Lagrangian case is the SPH simulation using the material null for a SPH model with 26,000 particles. Figure 20: Result of the interaction for the SPH simulation of the tapered plate. 5.3 Impact for a Tapered Plate (Impact at 30 deg)  Now we explain the simulation of a cylindrical bird impacting a tapered plate along the thinnest side. The deflection of the leading edge and the loads generated in the impact were computed for LS-DYNA. The type of material was the *MAT_NULL. Figure 21 shows the *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 103
  • 22. deformation of the tapered plate at different times of the simulation. In this case, the maximum normal deflection was 1.12 inches which was 6.96% higher than the value obtained by Moffat et al. [9]. The maximum value of the force had a value of 0.049 MN, 13.46% lower than the 0.0566 MN in the Lagrange simulation of the same impact which shows that a good convergence both for force and deflection occurs in this simulation. Figure 21: Deformation of the tapered plate using material null using SPH model. Table 5: Maximum normal deflection for a bird impacting a tapered plate at 30°. Other cases where also ran and results are enclosed in Table 5. Thus, the simulation that has better convergence to the maximum deflection found by Moffat is the SPH simulation using material null and 26,000 particles. In addition, for this model the peak force obtained was only 13.4% different from the one calculated using the Lagrange simulation with material elastic fluid. But if the peak force is compared with the Lagrangian case using the same null material the error is 8.93%. However, changing the material in the SPH simulation to the material elastic fluid does not result in a convergence of the force to the Lagrangian model using the same elastic fluid material. 104 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 23. 6. Final Remarks  After studying the influence of various parameters involved in the SPH bird model, we compared the peak pressure and we are ready to make some recommendation on when is it best to use this approach. First and foremost, the SPH bird model is far more complex than the Lagrangian bird model and the number of variables influencing the SPH model is higher than for the Lagrangian one. For the SPH bird model, the mesh density or number of particles included has a strong influence in the peak impact pressure. This causes the selection of an optimum number of particles before beginning further simulations. For the first case, the frontal impact against a flat rigid plate, a bird model with 8700 particles with one-way constraint contact type and a null material type can be used. The error obtained in the pressure after comparing with the experimental data is within 10%. For the Lagrangian model the error when using elastic fluid material and an eroding contact type produced and error of 9%. Therefore, the SPH model can successfully be used in this kind of frontal impacts. For the second case, 0 and 30 degrees impact against a tapered plate, the SPH model validates the results obtained in the literature. The SPH model is recommended over the Lagrangian model for angled impacts on tapered plates since the error of the maximum normal deflection in less than 7% when compared with the experimental data available in literature. These results are validated using 26,000 SPH particles, a eroding contact type and a null material. For the 0 degree impact, neither the Lagrangian nor the SPH provide any significant deformation. Results show very little interaction between the bird and the tapered plate because the bird is being sliced in two parts, being the null material the best approximation when using SPH. Based on the results, the SPH method can be considered as a good alternative to simulate bird-strike events although it is more complex in the model creation. 7. Acknowledgments  This work was performed under the grant number 24108 from the United Technologies Co., *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 105
  • 24. Pratt & Whitney. The authors gratefully acknowledge the grant monitors for providing the necessary computational resources and support for this work. The research presented herein is an extension of the work presented at the 47th AIAA/ASME/ACE/AHS/ASC SDM Conference, Rhode Island, May 2006, AIAA. 8. References  [1] V. K. Goyal, C. A. Huertas, T. J. Vasko, 2013. Bird-Strike Modeling Based on the Lagrangian Formulation Using LS-DYNA. Am. Trans. Eng. Appl. Sci. 2(2): 057-081. Available at: http://TuEngr.com/ATEAS/V02/057-081.pdf. Accessed: March 2013. [2] J. Metrisin, B. Potter, Simulating Bird Strike Damage in Jet Engines, ANSYS Solutions 3 (4) (2001) 8–9. [3] E. Parkes, “The permanent deformation of a cantilever strucks transversely at its tip”, in: Proceedings Roy. Soc. Lond., England, 1995. [4] W. J. Stronge, T. Yu, Dynamic Models for Structural Plasticity, Springer-Verlag, London, Great Britain, 1993. [5] W. Goldsmith, IMPACT: The Theory and Phisical Behaviour of Colliding Solids, Dover Publications, Mineola, New York, 2001. [6] B. N. Cassenti, Hugoniot Pressure Loading in Soft Body Impacts. [7] J. P. Barber, H. R. Taylor, J. S. Wilbeck, “Characterization of Bird Impacts on a Rigid Plate: Part 1”, Technical report AFFDL-TR-75-5, Air Force Flight Dynamics Laboratory, Wright-Patterson Air Force Base, OH (1975). [8] E. Niering, Simulation of Bird Strikes on Turbine Engines. [9] W. Moffat, Timothy J. and Cleghorn, “Prediction of Bird Impact Pressures and Damage Using MSC/DYTRAN”, in: Proceedings of ASME TURBOEXPO, Louisiana, 2001. [10] N. F. Martin, Nonlinear Finite Element Analysis to Predict Fan Blade Impact Damage. [11] J. Lacome, “Smooth Particle Hydrodynamics (SPH): A New Feature in LS-DYNA”, in: Proceedings of the 6th International LS-DYNA Users Conference, 2000. [12] J. Lacome, Smooth Particle Hydrodynamics-Part II (2001) 6–11. [13] L. H. Hut, P., G. Lake, S. M. J. Makino, T. Sterling, “Smooth Particle Hydrodynamics: Models, Applications, and Enabling Technologies”, in: Proceedings form the Workshop Presented by the Institute for Advance Study, Princeton., 1997. [14] V. K. a. C. A. H. Goyal, “Robust Bird-Strike Modeling Using LS-DYNA”, in: Proceeding of 106 Vijay K. Goyal, Carlos A. Huertas, and Thomas J. Vasko
  • 25. the 23th Southeastern Conference on Theoretical and Applied Mechanics Conference, Mayaguez, Puerto Rico., 2006. [15] D. R. Bowman, G. J. Frank, “IBRG ARTIFICIAL BIRD PROJECT”, Work programmed and Schedule, United Kingdom (2000). Dr. V. Goyal is an associate professor committed to develop a strong sponsored research program for aerospace, automotive, biomechanical and naval structures by advancing modern computational methods and creating new ones, establishing state-of-the-art testing laboratories, and teaching courses for undergraduate and graduate programs. Dr. Goyal, US citizen and fully bilingual in both English and Spanish, has over 17 years of experience in advanced computational methods applied to structures. He has over 15 technical publications with another three in the pipeline, author of two books (Aircraft Structures for Engineers and Finite Element Analysis) and has been recipient of several research grants from Lockheed Martin Co., ONR, and Pratt & Whitney. C. Huertas completed his master’s degree at University of Puerto Rico at Mayagüez in 2006. Currently, his is back to his home town in Peru working as an engineer. Dr. Thomas J. Vasko, Assistant Professor, joined the Department of Engineering at Central Connecticut State University in the fall 2008 semester after 31 years with United Technologies Corporation (UTC), where he was a Pratt & Whitney Fellow in Computational Structural Mechanics. While at UTC, Vasko held adjunct instructor faculty positions at the University of Hartford and RPI Groton. He holds a Ph.D. in M.E. from the University of Connecticut, an M.S.M.E. from RPI, and a B.S.M.E. from Lehigh University. He is a licensed Professional Engineer in Connecticut and he is on the Board of Directors of the Connecticut Society of Professional Engineers Peer Review: This article has been internationally peer-reviewed and accepted for publication according to the guidelines given at the journal’s website. *Corresponding author (V. Goyal), Tel.: 1-787-832-4040 Ext. 2111; E-mail: 2013. American Transactions on Engineering & Applied Sciences. vijay.goyal@upr.edu. Volume 2 No. 2 ISSN 2229-1652 eISSN 2229-1660 Online Available at http://TuEngr.com/ATEAS/V02/083-107.pdf 107