The talk will look at limitations of compilers when creating fast code and how to make more effective use of both the underlying micro-architecture of modern CPU's and how algorithmic optimizations may have surprising effects on the generated code. We shall discuss several specific CPU architecture features and their pros and cons in relation to creating fast C++ code. We then expand with several algorithmic techniques, not usually well-documented, for making faster, compiler friendly, C++.
Note that we shall not discuss caching and related issues here as they are well documented elsewhere.
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Evgeniy Muralev, Mark Vince, Working with the compiler, not against it
1. Working with the compiler, not against it
Evgeniy Muralev - Senior Software Engineer
Mark Vince - Senior Rendering Engineer
Sperasoft Spb.
2. We will talk about…
• Fragility of optimizations done by the compiler
• Coding strategies to “fit” the modern CPU
• Ways of optimizing algorithms respecting the CPU
The talk contains assembly code and some low-level material.
We will focus on compilation for x86 and associated CPUs, but material is
applicable to other instruction sets and architectures
3. Games industry
• We do care about performance
• ~16-33ms per frame is reality we are living in
• A lot of computation performed each frame (both CPU and GPU)
4. Myths about compilers
• Two extremes:
• “Compilers are terrible, use assembler!”
• “Compiler will do everything for you and is always better than you”
• Reality is neither is really true
5. So,…
• Over the last couple of decades compilers have become significantly
smarter
• Smart optimizations
• Unrolling
• LTO
• …
• However there is a great danger in assuming that compilers will do
everything for us (they won’t)
• Doesn’t know all data constraints
• May be not fully aware of underlying CPU micro-architecture
• Hopefully we will be able to demonstrate this
6. Utilizing ranges
• Assume we perform some integer (or floating-point) math in code
• Knowing that some variable lies in specific range may often enable
many optimizations
• We wondered how we can specify a limited range of values in C++
7. Utilizing ranges
• Types such as int8_t, int_least8_t, int_fast8_t, int16_t…
• Number of bits on a data element in class/struct (bitfields)
• // struct S { int a : 4; };
• Range of values on a branch:
• // if (a >= 0 && a <= 100)
• Deduced from logic flow:
• // a = a % 100
How we can specify a limited range of values:
8. Utilizing ranges
C++:
int divTest(uint n, uint k)
{
if (k > 0)
{
n %= (k+1);
return n / k;
}
return 0;
}
Obviously, after this operation n is in [0, k] range
Easily computed as (pseudo-assembly):
cmp n, k
sete al
9. Utilizing ranges
C++:
int divTest(uint n, uint k)
{
if (k > 0)
{
n %= (k+1);
return n / k;
}
return 0;
}
gcc 6.3 –O3: MSVC15 /O2:
test esi, esi
je .L7
lea ecx, [rsi+1]
mov eax, edi
xor edx, edx
div ecx
mov eax, edx
xor edx, edx
div esi
mov esi, eax
.L7:
mov eax, esi
ret
test edi,edi
je .L0
push esi
lea esi,[edi+1]
xor edx,edx
mov eax,ecx
div eax,esi
pop esi
mov eax,edx
xor edx,edx
div eax,edi
pop edi
ret
.L0
xor eax,eax
pop edi
ret
• Both compilers insert extra div…
• May take ~30 cycles depending on CPU
10. Utilizing ranges
int doDivisionBranch(int n)
{
if (n >= 0 && n < 123)
{
return n / 123;
}
return 0;
}
gcc 6.3 –O3: MSVC15 /O2:
xor eax, eax
ret
cmp ecx, 122
ja L1
mov eax, 558694933
imul ecx
sar edx, 4
mov eax, edx
shr eax, 31
add eax, edx
ret
L1:
xor eax, eax
ret
C++:
Will look at it later
11. Utilizing ranges
C++:
int doDivisionBranch(int n)
{
if (n >= 0 && n < 123)
{
return n / 123;
}
return 1;
}
gcc 6.3 –O3: MSVC15 /O2:
xor eax, eax
cmp edi, 122
seta al
ret
cmp ecx, 122
ja L1
mov eax, 558694933
imul ecx
sar edx, 4
mov eax, edx
shr eax, 31
add eax, edx
ret
L1:
mov eax, 1
ret
Still bad
12. Ranges
Little bit more complicated, but compiler already fails to recognize optimization opportunity
C++: You expect: gcc 6.3 –O3:
int doDivisionBranch(int n)
{
if (n >= 0 && n <= 123)
{
return n / 123;
}
return 1;
}
xor eax, eax
cmp edi, 122
seta al
ret
cmp edi, 123
mov eax, 1
ja .L2
mov eax, edi
mov edx, 558694933
sar edi, 31
imul edx
mov eax, edx
sar eax, 4
sub eax, edi
.L2:
rep ret
Oops…
13. Ranges continued
• Division by a constant can always be replaced by a multiplication and a
shift right
• For more information check out: Hacker’s Delight by Henry S. Warren
mov eax, edi
mov edx, 558694933
sar edi, 31
imul edx
mov eax, edx
sar eax, 4
sub eax, edi
• However this number above is for any 32-bit value being divided by 123
• Assuming we have just a narrow range of values, we could calculate a
much smaller number
14. Ranges
• Assuming n in [0, 40], we can use the magic-
number multiplier 26 and shift right by 8.
• Gives a compiler more potential for optimization
with surrounding code, less register usage, more
vectorization opportunities, etc.
• However our experiments seem to show that the
compilers we have tried are not doing this.
mov eax, edi
mov edx, 1717986919
sar edi, 31
imul edx
mov eax, edx
sar eax, 2
sub eax, edi
gcc 6.3 –O3:
if (n >= 0 && n <= 40)
{
return n / 10;
}
C++:
15. Remember SIMD?
• Vector registers to perform multiple operations in one instruction
• Vector registers are used even for scalar operations
Even wider registers on modern micro-architectures/IS:
ymm(256bit)/zmm(512bit)
20. • What can possibly confuse compiler?
Scalar addition
Problem with this one is that FP math is not associative
Reduction challenge
C++:
static float sum = 0;
void doSomething(float a)
{
sum += a;
}
for (int i = 0; i < N; ++i)
{
doSomething(arr[i]);
}
gcc 6.3 –O3:
.L4:
addss xmm0, DWORD PTR [rbp]
add rbp, 4
cmp rbp, OFFSET FLAT:arr+4194304
jne .L4
pop rbx
pop rbp
movss DWORD PTR sum[rip], xmm0
pop r12
ret
• E.g. we changed type to floating-point
21. .L4:
addps xmm1, XMMWORD PTR [rbp+0]
add rbp, 16
cmp r12, rbp
jne .L4
movaps xmm0, xmm1
pop rbx
movhlps xmm0, xmm1
pop rbp
addps xmm1, xmm0
pop r12
movaps xmm0, xmm1
shufps xmm0, xmm1, 85
addps xmm1, xmm0
movaps xmm0, xmm1
addss xmm0, xmm2
movss DWORD PTR sum[rip], xmm0
ret
Reduction challenge
C++:
static float sum = 0;
void doSomething(float a)
{
sum += a;
}
for (int i = 0; i < N; ++i)
{
doSomething(arr[i]);
}
gcc 6.3 –O3 –ffast-math
22. Give compiler more context
vxorps xmm0, xmm0, xmm0
.L4:
vaddps ymm0, ymm0, YMMWORD PTR [r13]
add r13, 32
cmp r14, r13
jne .L4
vhaddps ymm0, ymm0, ymm0
vhaddps ymm1, ymm0, ymm0
vperm2f128 ymm0, ymm1, ymm1, 1
vaddps ymm0, ymm0, ymm1
vaddss xmm0, xmm0, xmm2
vmovss DWORD PTR sum[rip], xmm0
gcc 6.3 –O3 –ffast-math –march=haswell
• Assume we know target CPU = Haswell microarchitecture?
• Let the compiler know!
Neat!
C++:
static float sum = 0;
void doSomething(float a)
{
sum += a;
}
for (int i = 0; i < N; ++i)
{
doSomething(arr[i]);
}
23. • Breaks all optimizations!
• Link-time optimization may help
• If not building DLL
• You not just paying for extra function call, but lose vectorization!
• And other potential optimizations!
Reduction challenge
C++:
static float sum = 0;
extern void doSomething(float a);
for (int i = 0; i < N; ++i)
{
doSomething(arr[i]);
}
24. RISC vs CISC
• RISC: Reduced Instruction Set Computing
• CISC: Complex Instruction Set Computing
• RISC:
• Simple addressing modes
• Uniform instruction format
• Fewer data types in hardware
• => Larger semantic gap between ISA and higher-level program
• => But simplifies hardware a lot
25. Microops
• On x86 we have visible CISC architecture ISA, but underlying CPU
actually works in RISC fashion…
• Instructions are decoded to micro-operations
add eax, [s] => load & add (2 microops)
push eax => sub ESP, 4 (2 microops)
mov [esp], eax
26. Out-of-order execution
Out of order part – execute
microops; Out-of-order
*Serialized again later to conform
memory consistency model requirements
Front-end: fetch and decode
instructions; In-order
27. Data dependencies
• This kind of loop actually can perform badly
• Each next iteration is dependent on previous one
• Data dependencies kill out-of-order execution!
C++:
for (int i = 2; i < N; ++i)
{
arr[i] = arr[i-2] + arr[i-1];
}
28. False dependencies
• But we are talking about *real* dependencies
• Remember Register renaming?
movaps xmm1, XMMWORD PTR .LC0[rip]
xor eax, eax
.L4:
add rax, 16
movaps xmm0, XMMWORD PTR a[rax-16]
mulps xmm0, xmm1
movaps XMMWORD PTR b[rax-16], xmm0
cmp rax, 4194304
jne .L4
C++:
for (int i = 0; i < N; ++i)
{
b[i] = a[i] * 0.5f;
}
31. Small recap
• Recap:
• Compiler won’t solve all problems for you
• Compiler optimizations may unexpectedly break, so be careful!
• Instructions executed out of order, blocked by real dependencies only
• Register renaming removes false dependencies
• Code that looks simple and elegant is not necessary fast
• Lets examine some code examples – how this affects
optimization
32. • Frame = one iteration of a loop
• Discreet frame = frame NOT dependent on any other frame
• Iterative frame = frame depends on another (previous) frame
for( int i = …. )
{
result[i] = i* 3 + 6;
}
for( int i = …. )
{
result[i] = i* 3 + result[i-1];
}
Frame dependencies
33. What blocks vectorization ?
• Various reasons code may not be vectorized by compiler.
• Compilers continue to improve, but don’t assume your code is vectorized
• Check the assembler!
Two important causes of vectorization failure:
Frame dependency - Frame depends on other (previous) frame(s) data.
Data collision - Target (eg. array index) is not unique.
34. AVX 512
AVX512 ( Intel Xeon Phi, Knights Landing )
• Special instructions (compress / expand) – give compilers a chance to
process several loop iterations (typically 4 or 8) in a single iteration.
Gives compiler better chance to vectorize.
• Conflict detection. AVX512-CD - Can be used when uniqueness of array
target cannot be determined.
35. • When we are writing to an array in a loop –
• construct a SIMD vector of indices in the array, for every 4 or 8
iterations.
• use vpconflictd to create a bitmask of non-unique indices.
• bitmask can then be used to vectorize unique elements and process
separate non-unique targets after.
• Specifically designed for compilers to vectorize loops.
for (int i = … )
{
int index = calculateIndex(i);
array[index] = ….;
}
Index may NOT be unique
- For example, hashing algorithms
AVX512 – conflict detection
36. Dependencies
We shall….
Look at how dependencies between frames can ‘break’ your optimizations.
What we can do to get around these problems. (when you don’t have AVX512! )
Look at just one type of optimization, evaluating polynomials, to demonstrate
Finally some useful mathematical rules, to break down difficult formula –
and how to use what we know about vectorization.
37. • Summing squares.
• Each iteration is not dependent and its easy to vectorize.
• Yes – This could be calculated as n(n+1)(2n+1) / 6 - but compiler doesn’t know this!
int xSqrSum(const int n)
{
int result = 0;
int a = 1;
int b = 0;
for (int i = 1; i < n; ++i)
{
b += a;
a += 2;
result += b;
}
return result;
}
Dependencies block
vectorization
- Dependencies between frames
- Dependencies inside frame
int xSqrSum(const int n)
{
int result = 0;
for (int i = 1; i < n; ++i)
{
result += i*i;
}
return result;
}
Discrete or Iterative - 𝑥2
38. Assembler
// Too much code to list here … main loop is….
.L30:
movdqa xmm2, xmm3
movdqa xmm1, xmm3
add edx, 1
pmuludq xmm2, xmm3
psrlq xmm1, 32
pshufd xmm2, xmm2, 8
pmuludq xmm1, xmm1
pshufd xmm1, xmm1, 8
cmp eax, edx
paddd xmm3, xmm4
punpckldq xmm2, xmm1
paddd xmm0, xmm2
ja .L30
xSqrSum (int):
cmp edi, 1
jle .L24
lea esi, [rdi-1+rdi]
xor ecx, ecx
mov edx, 1
xor eax, eax
.L23:
add ecx, edx
add edx, 2
add eax, ecx
cmp esi, edx
jne .L23
rep ret
.L24:
xor eax, eax
ret
Discrete ( vectorized ) Iterative
Two multiplies ?
- if we know 𝑥2
is a smaller
range we could do better.
- Another thing compiler could
use range information for.
39. • Often vectorized code has bigger footprint – but much faster
• Tail code can be reduced by processing exact multiples only for loop limit.
• We are concerned really with the main loop.
• Beware: if a loop calls an external method that cannot be ‘seen’ (eg. in a DLL) then
vectorization can fail because the method may take discreet single loop values.
• Same problem if you do NOT use link time optimization (whole program optimization).
‘Setup’ code - initial values, etc.
Main loop - processes blocks of typically 4 or 8
elements at once.
- processes remaining elements.
Setup
Main loop
Tail code
Fast code, big code
40. Strip-mining and vectorization
• We can break the range of values in a loop into multiple sub-ranges.
• To calculate squares from 1 to 100 we could split this into 4 ranges, and process each strip
in a different channel of a SIMD register, in parallel.
1 to 25 26 to 50 51 to 75 76 to 100
1 to 100
𝑥2
𝑥2 𝑥2
𝑥2
SIMD pack
41. Breaking up ranges
• Firstly, we create a function to take a range, rather than 1..N
int xSqrIterativeRange( const int lo, const int hi )
{
int result = 0;
int b = (lo - 1)*(lo - 1);
int a = lo + lo - 1;
for (int i = lo; i < hi; ++i)
{
b += a;
a += 2;
result += a;
}
return result;
}
Initial loop values calculated, explained later
42. Parallel ranges .. 4 channels
int xSqrIterativeRange4( const int lo0, const int lo1, const int lo2, const int lo3, const int range)
{
int result0 = (lo0 - 1)*(lo0 – 1);
int result1 = (lo1 - 1)*(lo1 – 1);
…. // result2, result3
int b0 = ( lo0 -1 ) * ( lo0 – 1 ); a0 = lo0 + lo0 – 1;
int b1 = ( lo1 -1 ) * ( lo1 – 1 ); a1 = lo1 + lo1 – 1;
…… // a2, a3
for (int i = 0; i < range; ++i)
{
b0 += a0; a0 += 2;
b1 += a1; a1 += 2;
….. // b2,a2, b3,a3 …
result += a0 + a1 + a2 + a3;
}
return result;
}
43. Ranges NOT vectorized
• Gcc failed to vectorize this – why ?
• Answer:
• If we replace the sum in the loop with four separate partial sums, it
does vectorize:
• Or… we can optimize this by hand, using SIMD intrinsics.
result += a0 + a1 + a2 + a3;
Result0 += a0;
Result1 += a1;
Result2 += a2;
Result3 += a3;
44. int xSqrIterativeRange4( const int lo0, const int lo1, const int lo2, const int lo3, const int range)
{
int result0 = (lo0 - 1)*(lo0 – 1);
int result1 = (lo1 - 1)*(lo1 – 1);
…. // result2, result3
int b0 = ( lo0 -1 ) * ( lo0 – 1 ); a0 = lo0 + lo0 – 1;
int b1 = ( lo1 -1 ) * ( lo1 – 1 ); a1 = lo1 + lo1 – 1;
…… // a2, a3
for (int i = 0; i < range; ++i)
{
b0 += a0; a0 += 2;
b1 += a1; a1 += 2;
….. // b2,a2, b3,a3 …
}
return result0 + result1 + result2 + result3;
}
result0 += a0;
result1 += a1;
….
Vectorizable code
45. Quick summary
• Optimization of discrete loops can add dependencies which are hard to vectorize
• Can break up ranges into sub-ranges and re-code for parallelism, ie. strip-
mining.
• May need to hand-craft SIMD with intrinsics.
• Often we can find clever iterative ways of ‘optimizing’ loop functions to require
less mathematical operations …
46. Iterative - floating point
• Big problem – cumulative errors.
• Compiler may not vectorize because re-arranging terms may not give the same
result due to rounding etc.
• Some classical optimizations not always worth the problems.
Eg. loop for calculating sin and cos iteratively done with a couple of additions
per iteration, but cumulative errors may be problematic.
47. Example… Polynomials
• Iteratively can evaluate using only additions per frame.
• Number of additions = maximum power + 1
• But Which is fastest ? – can’t assume that less math. operations is fastest.
• Only looking at integers here. The same principles apply to floating point but
there are other problems too.
Eg: 𝟓𝒙 𝟑 + 𝟑𝒙 𝟐 + 𝒙 − 𝟒
Iterative: 4 additions, each dependent on last
Discreet: Several multiplications and adds.
48. Polynomial differencing
• This is old idea, - Babbage’s Difference Engine etc.
• Let us have a polynomial P(x) of order ‘n’, P(x+1) – P(x) is of order n-1
Eg. P(x) = 𝒙^𝟐 , P(x+1) – P(x) = 𝟐𝒙 + 𝟏 (1)
Let Q(x) = 𝟐𝒙 + 𝟏 , Q(x+1) – Q(x) = 𝟐 (2)
• Keep repeating the process, record the new polynomial until a constant is reached.
• In this example, we now have the the polynomials ( 𝒙^𝟐 , 𝟐𝒙 + 𝟏 , 2 )
• We begin by calculating each of these terms at our initial value, then every time we
iterate the loop we add each term to the previous one, and we get the next value of the
polynomial.
49. 𝑥 = 2 3 4 5 …
𝑥2
= 4 9 16 25 …
2𝑥 + 1 = 5 7 9 …
2 = 2 2 …
void Loop()
{
int a = 4;
int b = 5;
int c = 2;
while(….)
{
// a = x^2 here
a += b;
b += c;
}
}
Polynomial differences
50. ( 𝟓𝒙 𝟑 + 𝟑𝒙 𝟐 + 𝒙 − 𝟒)
• Discrete: (compiler vectorizes the main loop)
int polynomial(int n)
{
int sum = 0;
for( int i = 1; i < n; ++i )
{
int result = 5 * i*i*i + 3 * i*i + i – 4;
sum += result;
}
return sum;
}
Compiler reduces the number of multiplies
with shifts and adds, etc
51. ( 𝟓𝒙 𝟑 + 𝟑𝒙 𝟐 + 𝒙 − 𝟒)
• Iterative: (compiler does not vectorize this! )
int polynomial(int n)
{
int sum = 0;
int a = -4 ; // 5x^3 + 3x^2 + x – 4, at x = 0
int b = 9 ; // q(x) = p(x+1) - p(x) = 15x^2 + 21x + 9, at x = 0
int c = 36; // r(x) = q(x+1) – q(x) = 30x + 36, at x = 0
int d = 30; // r(x+1) – r(x) = 30
for( int i = 1; i < n; ++i )
{
a += b; b+= c; c+= d;
sum += a;
}
return sum;
}
Dependencies !!!
52. Modular arithmetic
• To prevent integer calculations going out of range (outside the native bit-length of
the CPU)
• Limit our discussion here to briefly show a simple technique to solve some
problems.
• Look an example to demonstrate.
• Compilers are not using these techniques and so its up to you!
53. Continued…
• What kind of problem ?
• Result is ‘in range’ but partial results too big.
• Simple example is: 𝒓 = 𝒂 ∗ 𝒃 /𝒄
• The result of 𝒂 ∗ 𝒃 may be more than one machine word
• Instruction sets typically have a multiply to produce two words, and divide takes two
word numerator as input.
on x86 we multiply two 32-bits to get edx,eax = 64 bit result in two registers.
If we divide it, the idiv instruction takes both registers as 64 bit numerator input.
54. Modular Exponentiation
So, Lets look at a more interesting problem not solved so easily:
Remember…. We are dealing with positive integers here
We know that 𝒓 must be in the range [ 0, c-1]
Raising a to the power b can result in huge numbers. Far too big for
the machine word length.
𝒓 = (𝒂 𝒃
) 𝒎𝒐𝒅 𝒄
55. 𝒓 = 𝒂 𝒃
𝒎𝒐𝒅 𝒄
• A few maths things we can do, but we want a general solution.
• We reduce the power b.
• We create an algorithm which iterates through a loop to get the result.
56. Reducing the power
𝜑 𝑐 = Euler Totient Function 𝝋 𝒄 = 𝒄 ∗ ∏(𝟏 −
𝟏
𝒑
) = 𝒄 ∗ (𝟏 −
𝟏
𝒑 𝟎
) ∗ (𝟏 −
𝟏
𝒑 𝟏
) …
Where 𝑝 = prime factor of c
Example:
𝝋 𝟏𝟎𝟎 = ( 𝟏 −
𝟏
𝟐
) ( 1 −
𝟏
𝟓
) = 40;
since 100 = 22
. 52
, ( prime factors of 100 being 2 and 5 )
𝑖𝑓 𝑟 = 𝑎 𝑏 𝑚𝑜𝑑 𝑐
𝑟 = 𝑎 𝑏 𝑚𝑜𝑑 𝜑 𝑐
𝑚𝑜𝑑 𝑐
57. Example
567123 𝑚𝑜𝑑 100
= 567 (123 𝑚𝑜𝑑 40)
𝑚𝑜𝑑 100 // since 𝜑 100 = 40
= 5673
𝑚𝑜𝑑 100
• A smaller power makes the modular exponentiation faster.
• Keep a table of precomputed totient functions.
567^123 has 1126 bits!
58. Useful relationships
Suppose we have three integers: a, b, c
Let : 𝒓 = 𝒂 𝒎𝒐𝒅 𝒄
𝒔 = 𝒃 𝒎𝒐𝒅 𝒄
Then:
Simple, but really useful to break formula into smaller parts.
Allows us to find solutions which consists of loops which iteratively evaluate a result,
without going out of range.
𝒂𝒃 𝒎𝒐𝒅 𝒄 = (𝒓𝒔) 𝒎𝒐𝒅 𝒄 (1)
(𝒂 + 𝒃) 𝒎𝒐𝒅 𝒄 = (𝒓 + 𝒔) 𝒎𝒐𝒅 𝒄 (2)
59. To evaluate: 𝒓 = 𝒂 𝒃
𝒎𝒐𝒅 𝒄
First reduce b using the totient function => less computation.
Then we can break up 𝒂 𝒑
using the bits of 𝒑 : // 𝒑 = b mod 𝝋 𝒄
eg. (𝑝 =21): 𝒂 𝟐𝟏
𝒎𝒐𝒅 𝒄 = (𝒂 𝟏𝟔
. 𝒂 𝟒
. 𝒂 𝟏
) 𝒎𝒐𝒅 𝒄
Create a loop to calculate each binary power of ‘a’ mod c by squaring the previous one.
𝒂 𝟐𝒏
𝒎𝒐𝒅 𝒄 = 𝒂 𝒏
𝒎𝒐𝒅 𝒄 𝟐
𝒎𝒐𝒅 𝒄
Combining these formulae we can get some code ………
Exponentiation continued…
60. int expMod( int a, int b, int c) // for 32 bit, b < 1^31-1 because of the mask test
{
int mask = 1;
int r = 1;
while(1)
{
mask += mask;
if (mask > b) break;
}
return r;
}
a *= a;
a %= c;
if (b & mask)
{
r*= a;
r %= c;
}
Combine for set bits…
(recall, 𝒂 𝟐𝟏 𝒎𝒐𝒅 𝒄 = (𝒂 𝟏𝟔 . 𝒂 𝟒. 𝒂 𝟏 ) 𝒎𝒐𝒅 𝒄 )
𝒂 𝟐𝒏
𝒎𝒐𝒅 𝒄 = 𝒂 𝒏
𝒎𝒐𝒅 𝒄 𝟐
𝒎𝒐𝒅 𝒄
expMod
61. uint expMod( int a, int b, int c )
{
int mask = 1; int r = 1;
while(1)
{
if (b & mask)
{
r*= a;
}
mask += mask;
if (mask > b) break;
a *= a;
}
return r;
}
if ( r > MAXROOT ) r %= c;
if ( a > MAXROOT ) a %= c;
if (r > c) r %= c;
• We only need to take the mod when a
multiply next time will cause an overflow
• This means that the final result may need a
mod to bring it into range.
• MAXROOT = the square root of the biggest
integer. 32-bit = 0xFFFF
64-bit = 0xFFFFFFFF
One last optimization
62. • Dependencies both inside loop frames and between frames.
• Difficult to break into sub-ranges – can’t determine initial state for
each sub-range.
• BUT!... Many other ways to improve performance of this kind of
algorithm – beyond the scope of this discussion.
Same old problems
63. Another code sample
• Another example of using modular arithmetic -
• Uses just additive operations and compares -
• Examines bits of ‘b’ in a right-to-left way (least significant to most) -
• Again, code is very suboptimal, but just for demonstration.
b mod c
No division
Any size numerator
64. int mod( int b, int c) // b % c without division for 32 bit, b range [1, 2^31-1]
{
int mask = 1;
int r = 0;
int a = 1;
while(1)
{
if (b & mask)
{
}
mask += mask;
if (mask > b) break;
}
return r;
}
r += a;
if( r >= c ) r -= c;
a+=a;
if( a >= c ) a -= c;
Add 𝟐𝒊
𝒎𝒐𝒅 𝒄 to the total
Calculate 𝟐𝒊
𝒎𝒐𝒅 𝒄 each iteration
b mod c
65. Recap
• Remember about Instruction level parallelism
• Vectorization for SIMD easily broken
• Range information is not fully used by the compiler
• Mathematical tricks to optimize may not be as effective as they appear
• Modular arithmetic can be used to break up difficult computations