hypergeom without symbolic math toolbox

Dyuman Joshi 2023년 8월 21일

"I have tried some of the posted in the file exchange, but they all tend to give different results for large arguments compared to hypergeom."

The functions posted in FEX are numerical where as the hypergeom function is symbolical. There will be a difference in the precision of the values obtained.

"is there any way to use the hypergeom function without having the symbolic math toolbox?"

No, atleast not symbolically.

Why do you not want to use the symbolic math toolbox? Or do you not have access to it?

Star Strider 2023년 8월 21일

Please describe the problem you want to solve.

Eze Far 2023년 8월 21일

I don't have the symbolic math toolbox.

I'm fitting a function to some data. The function involves the confluent hypergeometric function of the first kind 1F1(a,b,z), where in my case z is real and can go to large values. I'm thinking to use the integral expression, but I guess it will take much longer than hypergeom. Thank you

Torsten 2023년 8월 21일

편집: Torsten 2023년 8월 21일

MATLAB Online에서 열기

I'm thinking to use the integral expression, but I guess it will take much longer than hypergeom.

Just test it:

https://uk.mathworks.com/matlabcentral/answers/261559-confluent-hypergeometric-function-of-the-first-kind?s_tid=prof_contriblnk

F = @(a,b,z) gamma(b)/(gamma(b-a)*gamma(a))*integral(@(t) exp(z.*t).*t.^(a-1).*(1-t).^(b-a-1),0,1);
tic
for i = 1:1000
    F(1,2,-pi);
end
toc
Elapsed time is 0.119686 seconds.
tic
for i = 1:1000
    hypergeom(1,2,-pi);
end
toc
Elapsed time is 8.940058 seconds.

Dyuman Joshi 2023년 8월 21일

MATLAB Online에서 열기

@Torsten, that function won't work when a==b, and it does not provide a solution for large(ish) values.

(One could argue if 100 is large or not)

F = @(a,b,z) gamma(b)/(gamma(b-a)*gamma(a))*integral(@(t) exp(z.*t).*t.^(a-1).*(1-t).^(b-a-1),0,1);
%1
F(1,2,3)
ans = 6.3618
hypergeom(1,2,3)
ans = 6.3618
%2
F(1e2,1e1,1e0)
Warning: Inf or NaN value encountered.
ans = NaN
hypergeom(1e2,1e1,1e0)
ans = 2.4862e+03
%3
F(10,5,1)
Warning: Minimum step size reached near x = 1. There may be a singularity, or the tolerances may be too tight for this problem.
ans = 0
hypergeom(10,5,1)
ans = 6.4804

Torsten 2023년 8월 21일

Yes, it was a lousy attempt ... But at least it shows that numerical evaluation can be much faster - if it works :-)

Eze Far 2023년 8월 21일

It works just fine for a=1/2 and b=3/2. Thanks

Walter Roberson 2023년 8월 21일

hypergeomic function has a tendancy towards large intermediate values.

Dyuman Joshi 2023년 8월 21일

"It works just fine for a=1/2 and b=3/2."

The FEX submissions didn't work for these values?

the cyclist 2023년 8월 21일

For some values of parameters, hypergeometric variates can also be well approximated by either binomial or poisson variates. (Web search turns these up, if that sounds useful.)

hypergeom without symbolic math toolbox

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