How can the theoretical peak performance of 4 floating point operations (double precision) per cycle be achieved on a modern x86-64 Intel cpu?

As far as I understand it take 3 cycles for an sse `add`

and 5 cycles for a `mul`

to complete on most of the modern Intel cpu's (see e.g. Agner Fog's 'Instruction Tables' ). Due to pipelining one can get a throughput of 1 `add`

per cycle if the algorithm has at least 3 independent summations. Since that is true for packed `addpd`

as well as the scalar `addsd`

versions and sse registers can contain 2 `double`

's the throughput can be as much as 2 flops per cycle.
Furthermore it seems (although I've not seen any proper doc on this) `add`

's and `mul`

's can be executed in parallel giving a theoretical max throughput of 4 flops per cycle.

However, I've not been able to replicate that performance with a simple c/c++ programme. My best attempt resulted in about 2.7 flops/cycle. If anyone can contribute a simple c/c++ or assembler programme which demonstrates peak performance that'd be greatly appreciated.

My attempt:

```
#include <stdio.h>
#include <stdlib.h>
#include <math.h>
#include <sys/time.h>
double stoptime(void) {
struct timeval t;
gettimeofday(&t,NULL);
return (double) t.tv_sec + t.tv_usec/1000000.0;
}
double addmul(double add, double mul, int ops){
// need to initialise differently otherwise compiler might optimise away
double sum1=0.1, sum2=-0.1, sum3=0.2, sum4=-0.2, sum5=0.0;
double mul1=1.0, mul2= 1.1, mul3=1.2, mul4= 1.3, mul5=1.4;
int loops=ops/10; // we have 10 floating point ops inside the loop
double expected = 5.0*add*loops + (sum1+sum2+sum3+sum4+sum5)
+ pow(mul,loops)*(mul1+mul2+mul3+mul4+mul5);
for(int i=0; i<loops; i++) {
mul1*=mul; mul2*=mul; mul3*=mul; mul4*=mul; mul5*=mul;
sum1+=add; sum2+=add; sum3+=add; sum4+=add; sum5+=add;
}
return sum1+sum2+sum3+sum4+sum5+mul1+mul2+mul3+mul4+mul5 - expected;
}
int main(int argc, char** argv) {
if(argc!=2) {
printf("usage: %s <num>\n", argv[0]);
printf("number of operations: <num> millions\n");
exit(EXIT_FAILURE);
}
int n=atoi(argv[1])*1000000;
if(n<=0) n=1000;
double x=M_PI;
double y=1.0+1e-8;
double t=stoptime();
x=addmul(x,y,n);
t=stoptime()-t;
printf("addmul:\t %.3f s, %.3f Gflops, res=%f\n",t,(double)n/t/1e9,x);
return EXIT_SUCCESS;
}
```

Compiled with

```
g++ -O2 -march=native addmul.cpp ; ./a.out 1000
```

produces the following output on an Intel Core i5-750, 2.66 GHz

```
addmul: 0.270 s, 3.707 Gflops, res=1.326463
```

i.e. just about 1.4 flops per cycle. Looking at the assembler code with
`g++ -S -O2 -march=native -masm=intel addmul.cpp`

the main loop seems kind of
optimal to me:

```
.L4:
inc eax
mulsd xmm8, xmm3
mulsd xmm7, xmm3
mulsd xmm6, xmm3
mulsd xmm5, xmm3
mulsd xmm1, xmm3
addsd xmm13, xmm2
addsd xmm12, xmm2
addsd xmm11, xmm2
addsd xmm10, xmm2
addsd xmm9, xmm2
cmp eax, ebx
jne .L4
```

Changing the scalar versions with packed versions (`addpd`

and `mulpd`

) would double the flop count without changing the execution time and so I'd get just short of 2.8 flops per cycle. Any simple example which achieves 4 flops per cycle?

**Edit:**

Nice little programme by Mysticial, here are my results (run just for a few seconds though):

`gcc -O2 -march=nocona`

: 5.6 Gflops out of 10.66 Gflops (2.1 flops/cycle)`cl /O2`

, openmp removed: 10.1 Gflops out of 10.66 Gflops (3.8 flops/cycle)

It all seems a bit complex but my conclusions so far:

`gcc -O2`

changes the order of independent floating point operations with the aim of alternating`addpd`

and`mulpd`

's if possible. Same applies to`gcc-4.6.2 -O2 -march=core2`

.`gcc -O2 -march=nocona`

seems to keep the order of fp operations as defined in the C++ source.`cl /O2`

, the 64-bit compiler from the SDK for Windows 7 does loop-unrolling automatically and seems to try and arrange operations so that groups of 3`addpd`

's alternate with 3`mulpd`

's (well at least on my system and for my simple programme).My Core i5 750 (Nahelem architecture) doesn't like alternating add's and mul's and seems unable to run both ops in parallel. However, if grouped in 3's it suddenly works like magic.

Other architectures (possibly Sandy Bridge and others) appear to be able to execute add/mul in parallel without problems if they alternate in the assembly code.

Although difficult to admit, but on my system

`cl /O2`

does a much better job at low level optimising operations for my system and achieves close to peak performance for the little c++ example above. I measured between 1.85-2.01 flops/cycle (have used clock() in Windows which is not that precise I guess, need to use a better timer - thanks Mackie Messer).The best I managed with

`gcc`

was to manually loop unroll and arrange additions and multiplications in groups of three. With`g++ -O2 -march=nocona addmul_unroll.cpp`

I get at best`0.207s, 4.825 Gflops`

which corresponds to 1.8 flops/cycle which I'm quite happy with now.

In the c++ code I've replaced the `for`

loop with

```
for(int i=0; i<loops/3; i++) {
mul1*=mul; mul2*=mul; mul3*=mul;
sum1+=add; sum2+=add; sum3+=add;
mul4*=mul; mul5*=mul; mul1*=mul;
sum4+=add; sum5+=add; sum1+=add;
mul2*=mul; mul3*=mul; mul4*=mul;
sum2+=add; sum3+=add; sum4+=add;
mul5*=mul; mul1*=mul; mul2*=mul;
sum5+=add; sum1+=add; sum2+=add;
mul3*=mul; mul4*=mul; mul5*=mul;
sum3+=add; sum4+=add; sum5+=add;
}
```

and the assembly now looks like

```
.L4:
mulsd xmm8, xmm3
mulsd xmm7, xmm3
mulsd xmm6, xmm3
addsd xmm13, xmm2
addsd xmm12, xmm2
addsd xmm11, xmm2
mulsd xmm5, xmm3
mulsd xmm1, xmm3
mulsd xmm8, xmm3
addsd xmm10, xmm2
addsd xmm9, xmm2
addsd xmm13, xmm2
...
```

`-funroll-loops`

is probably something to try. But I think`-ftree-vectorize`

is besides the point. The OP is trying just to sustain 1 mul + 1 add instruction/cycle. The instructions can be scalar or vector - it doesn't matter since the latency and throughput are the same. So if you can sustain 2/cycle with scalar SSE, then you can replace them with vector SSE and you'll achieve 4 flops/cycle. In my answer I did just that going from SSE -> AVX. I replaced all the SSE with AVX - same latencies, same throughputs, 2x the flops. – Mysticial Jan 20 '12 at 9:26