Jiahao, it's not just for reproducing the Wikipedia figure. I will need to compute higher orders as well, i.e. Hn for n = 48. I was just wondering if there was anything already implemented in Julia. Meanwhile I found this: https://github.com/daviddelaat/Orthopolys.jl
On Monday, February 2, 2015 at 4:50:00 PM UTC+1, Andras Niedermayer wrote: > > I was looking for Hermite polynomials and haven't found any code. I have > some (very unpolished) code. > > I haven't made a public package yet, since it needs to be improved > (especially in terms of efficiency, also documentation). Unfortunately, I'm > unlikely to have time for this in the near future, so I'll just post a link > to a gist: > https://gist.github.com/afniedermayer/57873094430e8ddb201c > > I mainly used it with the output of the ODE.jl. > > I hope this is a useful starting point... > > Best, > Andras > > On Monday, February 2, 2015 at 4:38:57 PM UTC+1, Andrei Berceanu wrote: >> >> Yes, exactly, in order to generate plots like >> http://en.wikipedia.org/wiki/Hermite_polynomials#mediaviewer/File:Hermite_poly_phys.svg >> >> //A >> >> On Monday, February 2, 2015 at 4:36:55 PM UTC+1, Jiahao Chen wrote: >>> >>> >>> > Is there an easy way to compute Hn(x)? >>> >>> Do you mean to evaluate a given Hermite polynomial of order n at a value >>> x? >>> >>
