| Bill Allombert on Tue, 27 May 2025 13:15:55 +0200 |
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| Re: How to determine Mod(a,b) with t_COMPLEX b? |
On Tue, May 27, 2025 at 12:53:44PM +0200, hermann@stamm-wilbrandt.de wrote: > On 2025-05-27 00:40, Bill Allombert wrote: > > > > > > The minimal residue of 1+4*I modulo 3+2*I is the yellow point -I in > > > the > > > example: > > > https://en.wikipedia.org/wiki/Gaussian_integer#Describing_residue_classes > > > > > > How can minimal residue of an input gaussian integer modulo a gaussian > > > integer be computed in PARI/GP? > > > > nf=nfinit(i^2+1) > > a=1+4*i;b=3+2*i; > > nfeltdivrem(nf,a,b) > > %4 = [[1,1]~,[0,-1]~] > > > > Cheers, > > Bill. > > > Thank you, so the rem part is what I asked for. > Interesting, "i" is free variable and not sqrt(-1) which is "I" in GP. > > Now that type(b) is t_POL, Mod(a,b) works as well. > What is the meaning of "-5" in Mod(a,b) result? This is the remainder of the Euclidean division of 1+4*x by 3+2*x. Indeed: ? divrem( 1+4*x , 3+2*x) %1 = [2,-5]~ Cheers, Bill.