Re: Does `qfbsolve(,3)` misses solutions in p=5;so=qfbsolve(Qfb(p,p,p),3

Aurel Page on Wed, 10 Jul 2024 11:38:05 +0200

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Re: Does `qfbsolve(,3)` misses solutions in p=5;so=qfbsolve(Qfb(p,p,p),3*p,3)?

To: pari-dev@pari.math.u-bordeaux.fr
Subject: Re: Does `qfbsolve(,3)` misses solutions in p=5;so=qfbsolve(Qfb(p,p,p),3*p,3)?
From: Aurel Page <aurel.page@normalesup.org>
Date: Wed, 10 Jul 2024 11:38:01 +0200
Delivery-date: Wed, 10 Jul 2024 11:38:05 +0200
In-reply-to: <CAGUWgD_P7MVF4RUNCauL1DMc+h9DGGGdZGrOsVashaDPnwO+hw@mail.gmail.com>
References: <CAGUWgD_P7MVF4RUNCauL1DMc+h9DGGGdZGrOsVashaDPnwO+hw@mail.gmail.com>
User-agent: Mozilla Thunderbird

Dear Georgi,

Even with flag=1, qfbsolve returns solutions up to the action of theorthogonal group. In your case, [2,-1] and [1,1] are in the same orbit.


Best,
Aurel

On 10/07/2024 11:21, Georgi Guninski wrote:

I am experimenting with integer factorization described in [1]

Does qfbsolve(,3) misses the solution [1,1] in:

? p=5;so=qfbsolve(Qfb(p,p,p),3*p,3)
%5 = [[2, -1]]

[1]:  https://mathoverflow.net/questions/474328/could-efficient-solutions-of-x2n-y2-a-be-related-to-integer-factorization
Could efficient solutions of x^2+n y^2=A be related to integer factorization?

References:
- Does `qfbsolve(,3)` misses solutions in p=5;so=qfbsolve(Qfb(p,p,p),3*p,3)?
  - From: Georgi Guninski <gguninski@gmail.com>

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