2. Power Law Distribution
(Scale Free)
This is a Classic and Very Important Distribution
A power law is a special kind of mathematical relationship
between two quantities. When the frequency of an event varies
as a power of some attribute of that event (e.g. its size), the
frequency is said to follow a power law.
3. Power Law Distribution
(Scale Free)
Pareto distribution ( Wealth Distribution )
Zipf's law ( Natural Language Frequency )
Links on the Internet
Citations
Richardson's Law for the severity of violent conflicts (wars
and terrorism)
Population of cities
Etc.
Examples:
4. Power Laws Appear to be a
Common Feature of Legal Systems
Katz, et al (2011)
American Legal Academy
Katz & Stafford (2010)
American Federal Judges
Geist (2009)
Austrian Supreme Court
Smith (2007)
U.S. Supreme Court
Smith (2007)
U.S. Law Reviews
Post & Eisen (2000)
NY Ct of Appeals
6. “ [T]here are known knowns; there are things we know we know.
We also know there are known unknowns; that is to say we know
there are some things we do not know.
But there are also unknown unknowns – there are things we do
not know we don't know. ”
United States Secretary of Defense
Donald Rumsfeld
7. Unknown, Unknowns and
Inductivist Reasoning
Philosophy of Science =
How do we Know What We Know?
Black Swan Problem
Even If We Observe White Swan after White Swan
cannot induce that all swans are white
8. Learning by Falsification
Science Advances Incrementally as Hypotheses
are Falsified
Popperian Perspective
Karl Popper Rejected Inductivist Reasoning
9. Learning by Falsification
the sun has risen every day for as long as anyone can
remember.
what is the rational proof that it will rise tomorrow?
How can one rationally prove that past events will continue to
repeat in the future, just because they have repeated in the
past?
Of Course, Certain Hypothesis cannot likely be falsified
on a Reasonable Time Scale
The problem of induction:
10. Learning by Falsification
No Need to Reject the Hypothesis of Sun Rising
Popper Solution to the Question:
Cannot Really Formulate a Theory that Can Prove
that the Sun Will Always Rise
Can Develop a Theory that It Rise which will be
falsified if the sun fails to rise
12. The Null and
Alternative Hypothesis
Criminal Trial Burden of Proof
Example from Criminal Law:
Must Be Overruled Beyond a Reasonable Doubt
Presumption of Innocence
Not Possible to Conclusively Prove a Lack of
Innocence (with zero doubt)
13. The Null and
Alternative Hypothesis
Study is Typically Designed to Determine Whether
a Particular Hypothesis is Supported
Switch Now To a Scientific Inquiry:
Start with Presumption that Hypothesis is Not True
(Null Hypothesis)
Researcher Must Demonstrate That The
Presumption is Unlikely to Be True given the
Population
14. Example: Coin Flip
Nostradamus
Predicting Coin Flips -
Does you Friend Have the General Ability to Actually
Predict Coin Flips?
How Would You Evaluate This Proposition?
How Many Predictions Would Your Friend Have to Get
Right For You To Believe They Actually Have Real
Ability?
15. Ho: Cannot Actually Predict Coin Flips
Example: Coin Flip
Nostradamus
H1: Can Actually Predict Coin Flip
(i.e. do so at a rate greater than chance)
Ho is the Null Hypothesis
H1 is the Alternative Hypothesis
16. Reject the Null versus
Failing to Reject the Null
If We Fail to Reject the Null, we are left with the
assumption of no relationship
In the Coin Flip Example, We might have enough
evidence to reject the null
Remember the default (null) is that there is no
relationship
Although a Relationship might actually exist
17. Coin Flip Nostradamus:
Binomial Distribution
Here is the Formula for a binomial experiment consisting of
n trials and results in x successes. If the probability of
success on an individual trial is P, then the binomial
probability is:
b(x; n, P) = nCx * Px
* (1 - P)n - x
What is the Probability Coin Flip Nostradamus Predicts
at least 3 of 4 Coin Tosses ?
18. 4!
Coin Flip Nostradamus:
Binomial Distribution
(3! (4-3)! )(.53
) (.54-3
)
(.125) (.5)
24
( 6(1)
) = .25
Here is the Prob of
Getting Exactly 3 of
4 correct
19. 4!
Coin Flip Nostradamus:
Binomial Distribution
(3! (4-3)! )(.53
) (.54-3
)
(.125) (.5)
24
( 6(1) ) = .25
Here is the Prob of
Getting Exactly 3 of
4 correct
= .3125
We Want “At Least” Which Implies BOTH 3 and 4
.25 + .0625
Exactly 3 Exactly 4 at least
3 of 4 Coin Tosses
20. Namely, there is a 31.25% Probability that by
Chance he/she would be able to predict at least
3 out of 4
If Our Would Be Coin Flip Nostradamus were able to
get 3 out 4 Correct - we would not generally be
prepared to give him/her credit just yet
Coin Flip Nostradamus:
Binomial Distribution
21. How Much Do We Need to Be Convinced that Our
Friend is Actually Coin Flip Nostradamus?
Now We Can Calculate Probability Associated of
Prediction across some arbitrary number of trials
Coin Flip Nostradamus:
Binomial Distribution
This is a Question of Type I and Type II
Error
24. Type I v. Type II Error
It is Depends Upon the Application
Typical Convention is that a 5% Chance of Error is
Acceptable for Purposes of Statistical Significance
Social Science = 5%
Medicine with Serious Side Effects might Require
Greater Level of Significance 1% or even less
25. Back To
Coin Flip Nostradamus
Predicts 43 out of 75 Correct
Okay let say Our Coin Flip Nostradamus agrees to run
75 coins flips in order to demonstrate his/her true
powers
Is this Sufficient to Label Our Friend the
Coin Flip Nostradamus?
29. Coin Flip Nostradamus
In this Case, the P Value is
Our P Value is the Probability of Observing this Data
Given the Null (i.e. that our friend does not have psychic
powers)
Our Pvalue > 5% Statistical
Significance Threshold
“Fail to Reject” Our Null of No Psychic Powers
(We Do not Say Accept -- see the induction problem)
30. One Tailed -or-
Two Tailed Tests
In the Coin Flip Nostradamus Example it would be
amazing if our friend could actually fail to predict 75
consecutive events
There is a Difference Between a Directional and a Non-
Directional Hypothesis
Note:
These are
Symmetric
31. One Tailed -or-
Two Tailed Tests
Stricter Crime Law and the Crime Rate
We are Often Interested in a Non-
Directional Hypothesis
We are Interested in Whether there is
Deterrence and if there were to be higher
crime rates
New Drug and Health
We Want to Both if It Makes the Patient Better
and if the Patient’s condition get worse
32. One Tailed -or-
Two Tailed Tests
Two Tailed Test
One Tailed Test
(negative direction)
One Tailed Test
(Positive direction)
36. An Example of a
Hypothesis Test
https://onlinecourses.science.psu.edu/stat500/book/export/html/43
z = (p - P) / σ
where p is our sample prov
P is theorized population prob
σ is our Standard Deviation
37. An Example of a
Hypothesis Test
https://onlinecourses.science.psu.edu/stat500/book/export/html/43
38. I roll a single die 1,000 times and
obtain a "6" on 204 rolls.
Is there significant evidence to
suggest that the die is not fair?
Another Example Question