| Bill Allombert on Sun, 07 Apr 2019 18:25:46 +0200 |
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| Re: Padé approximants? |
On Sun, Apr 07, 2019 at 02:46:23PM +0200, Dirk Laurie wrote: > I can't find a built-in function that computes Padé approximants of a > power series. > > e.g. pade(1 + x + 1/2*x^2 + 1/6*x^3 + 1/24*x^4 + O(x^5)) → (x^2 + 6*x > + 12)/(x^2 - 6*x + 12) > > It is of course quite easy to program for oneself in the nondegenerate > case (epsilon algorithm) but I wonder if it may be disguised as a > special case of a more general function. It is called bestapprPade: ? bestapprPade(1+x+1/2*x^2+1/6*x^3+1/24*x^4+O(x^5)) %19 = (x^2+6*x+12)/(x^2-6*x+12) Full disclosure: Henri Padé was a teacher at the French Lycée where I had been a student a century later. Cheers, Bill.