I'm dealing with the problem of accurately calculating the modified Bessel function of zero-th order I0 in CUDA.
For a long time, I have been using a rational Chebyshev approximation according to the paper
J.M. Blair, "Rational Chebyshev approximations for the modified Bessel functions I_0(x) and I_1(x)", Math. Comput., vol. 28, n. 126, pp. 581-583, Apr. 1974.
which, as compared to the result provided by Matlab, gives an average error of the order of 1e-29. Unfortunately, this seemingly high accuracy is not anymore enough for a new application I'm working on.
Matlab uses the Fortran routines developed by D.E. Amos
Amos, D.E., "A Subroutine Package for Bessel Functions of a Complex Argument and Nonnegative Order," Sandia National Laboratory Report, SAND85-1018, May, 1985.
Amos, D.E., "A Portable Package for Bessel Functions of a Complex Argument and Nonnegative Order," Trans. Math. Software, 1986.
which are available for download from the netlib/amos website.
There are ways to use those Fortran routines in a C/C++ code by compiling them in a library file and then using a C/C++ wrapper (see for example netlib_wrapping). I'm wondering if there is any means to make device functions out of those Fortran routines to be then called by a CUDA kernel).
MORE DETAILS ON THE PROBLEM
I have two codes, one written in Matlab and one in CUDA. Both operate on three steps:
1) Scaling by the modified Bessel function I0 and zero padding of data;
I'm comparing both with an "exact" result: As output of step 3), Matlab gives a relative root mean square error of 1e-10 % while CUDA of 1e-2%, so I started investigating why.
The root mean square difference between the first step of the two codes, namely
mean(mean(abs(U_Matlab-U_CUDA)))=6e-29 instead) so I would say it is good. Unfortunately, when I go to step 2, the error raises to
2e-4%. Finally, if I feed step 2) of CUDA with the output of step 1) of Matlab, then the rms error of step 2) becomes
1e-14%, which makes me think that a source of inaccuracy is due to the first step, namely, the calculation of the modified Bessel function.
FOR INTERESTING DEVELOPMENTS OF THIS DISCUSSION
Have a look at the NVIDIA Developer Zone Forum