# FLT_EPSILON for a nth root finder with SSE/AVX

I'm trying to convert a function that finds the nth root in C for a double value from the following link http://rosettacode.org/wiki/Nth_root#C to find the nth root for 8 floats at once using AVX.

Part of that code uses DBL_EPSILON * 10. However, when I convert this to use float with AVX I have to use FLT_EPSILON*1000 or the code hangs and does not converge. When I print out FLT_EPSILON I see it is order 1E-7. But this link, http://www.cplusplus.com/reference/cfloat/ , says it should be 1E-5. When I print out DBL_EPSILON it's 1E-16 but the link says it should only be 1E-9. What's going on?

Here is the code so far (not fully optimized).

``````#include <stdio.h>
#include <float.h>
#include <immintrin.h>                 // AVX

inline double abs_(double x) {
return x >= 0 ? x : -x;
}

double pow_(double x, int e)
{
double ret = 1;
for (ret = 1; e; x *= x, e >>= 1) {
if ((e & 1)) ret *= x;
}
return ret;
}

double root(double a, int n)
{
double d, x = 1;
x = a/n;
if (!a) return 0;
//if (n < 1 || (a < 0 && !(n&1))) return 0./0.; /* NaN */

int cnt = 0;
do {
cnt++;
d = (a / pow_(x, n - 1) - x) / n;
x+= d;
} while (abs_(d) >= abs_(x) * (DBL_EPSILON * 10));
printf("%d\n", cnt);

return x;
}

__m256 pow_avx(__m256 x, int e) {
__m256 ret = _mm256_set1_ps(1.0f);
for (; e; x = _mm256_mul_ps(x,x), e >>= 1) {
if ((e & 1)) ret = _mm256_mul_ps(x,ret);
}
return ret;
}

inline __m256 abs_avx (__m256 x) {
return _mm256_max_ps(_mm256_sub_ps(_mm256_setzero_ps(), x), x);
//return x >= 0 ? x : -x;
}

int get_mask(const __m256 d, const __m256 x) {
__m256 ad = abs_avx(d);
__m256 ax = abs_avx(x);
}

__m256 root_avx(__m256 a, int n) {
printf("%e\n", FLT_EPSILON);
printf("%e\n", DBL_EPSILON);
printf("%e\n", FLT_EPSILON*1000.0f);
__m256 d;
__m256 x = _mm256_set1_ps(1.0f);
//if (!a) return 0;
//if (n < 1 || (a < 0 && !(n&1))) return 0./0.; /* NaN */
__m256 in = _mm256_set1_ps(1.0f/n);
__m256 xtmp;
do {
d = _mm256_rcp_ps(pow_avx(x, n - 1));
d = _mm256_sub_ps(_mm256_mul_ps(a,d),x);
d = _mm256_mul_ps(d,in);
//d = (a / pow_avx(x, n - 1) - x) / n;
x = _mm256_add_ps(x, d); //x+= d;
xtmp =_mm256_mul_ps(x, _mm256_set1_ps(FLT_EPSILON*100.0f));
//} while (abs_(d) >= abs_(x) * (DBL_EPSILON * 10));
} while (get_mask(d, xtmp));
return x;
}

int main()
{
__m256 d = _mm256_set1_ps(16.0f);
__m256 out = root_avx(d, 4);
float result[8];
int i;
_mm256_storeu_ps(result, out);

for(i=0; i<8; i++) {
printf("%f\n", result[i]);
} printf("\n");

//double x = 16;
//printf("root(%g, 15) = %g\n", x, root(x, 4));

//double x = pow_(-3.14159, 15);
//printf("root(%g, 15) = %g\n", x, root(x, 15));
return 0;
}
``````
-
For single precision you definitely want `FLT_EPSILON` - the value should be 2^-23 = 1.1920929e-7 for IEEE-754 floats. –  Paul R Jun 14 '13 at 14:02
But the scalar code for the link converges for 10*DBL_EPSILON and for float with SSE I need 1000*FLT_EPSILON for convergence, that's why I'm confused. –  user2088790 Jun 14 '13 at 14:05
In normal scalar code floating point expressions are promoted to double precision - with SSE though there is no such promotion. –  Paul R Jun 14 '13 at 14:07
The scalar code is using double anyway. I thought it might have something to do with 80bit precision. –  user2088790 Jun 14 '13 at 14:08
The best accuracy I can get for the 4th root of 16 is 1.99910. Maybe there is a bug in my code. Shouldn't I be able to get it to within E-6 accuracy? –  user2088790 Jun 14 '13 at 14:10
show 6 more comments

`_mm256_rcp_ps`, which maps to the `rcpps` instruction, performs only an approximate reciprocal. The Intel 64 and IA-32 Architectures Software Developer’s Manual says its relative error may be up to 1.5•2-12. This is insufficient to cause the root finder to converge with accuracy `100*FLT_EPSILON`.

You could use an exact division, such as:

``````d = pow_avx(x, n-1);
d = _mm256_sub_ps(_mm256_div_ps(a, d), x);
``````

or add some refinement steps for the reciprocal estimate.

Incidentally, if your compiler supports using regular C operators with SIMD objects, consider using the regular C operators instead:

``````d = pow_avx(x, n-1);
d = a/d - x;
``````
-
That fixed it!. I started using _mm256_rcp_ps yesterday. I was not aware of its inaccuracy. –  user2088790 Jun 14 '13 at 17:47
Some compilers support regular C operators with SIMD objects? I was not aware of that. Which ones do this? I use GCC, ICC, and MSVC. –  user2088790 Jun 14 '13 at 19:42
@raxman: Apple’s version of GCC does. I do not know whether the changes to support that were ported back to the main GNU GCC, but I would think it more likely than not. Try it. –  Eric Postpischil Jun 14 '13 at 20:55
I will give it a try. Thanks for the information. Actually, that explains why one of the operations I was using worked in GCC but required using a intrinsic which I tried it in MSVC. –  user2088790 Jun 14 '13 at 21:09
`1e-5` is simply the maximum value the C standard allows an implementation to use for `FLT_EPSILON`. In practice, you'll be using IEEE-754 single-precision, which has an epsilon of 2-23, which is approximately `1e-7`.