Re: Integration Methods in PARI

Ilya Zakharevich on Mon, 04 Mar 2019 17:58:23 +0100

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Re: Integration Methods in PARI

To: Pari Users Mailing List <pari-users@pari.math.u-bordeaux.fr>
Subject: Re: Integration Methods in PARI
From: Ilya Zakharevich <nospam-abuse@ilyaz.org>
Date: Mon, 4 Mar 2019 08:58:13 -0800
Cc: Henri.Cohen@math.u-bordeaux.fr
Delivery-date: Mon, 04 Mar 2019 17:58:23 +0100
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On Fri, Mar 16, 2018 at 5:57 PM, <Henri.Cohen@math.u-bordeaux.fr> wrote:
> Pari is unable to integrate an oscillating function of this type; in
> fact I would be surprised if any software could do it. 

What is the problem?

    (06:34) gp > f(x) = sumnum(N=0,(x+N*2*Pi)/((x+N*2*Pi)^2+1) - N/(N^2+1)/2/Pi)
    %1 = (x)->sumnum(N=0,(x+N*2*Pi)/((x+N*2*Pi)^2+1)-N/(N^2+1)/2/Pi)
    (06:34) gp > \p 150
       realprecision = 154 significant digits (150 digits displayed)
    (06:34) gp > intnum(x=0, 2*Pi, exp(cos(x))*sin(sin(x))*f(x),1) - Pi/2*(exp(exp(-1))-1)
    time = 40,856 ms.
    %2 = -3.729170365600103372 E-154

The need to use the optional argument to intnum() is the (unfortunate)
catastrophic loss of precision in intnum().  (I reported it recently
with a possible fix.)

Ilya

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