| Karim Belabas on Sat, 23 Nov 2019 12:34:21 +0100 |
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| Re: Finding the generating funcction for a theta sequence? |
* Kevin Acres [2019-11-23 12:11]:
> I have sequence:
>
> [1, -12, 116, -12, -1804, 8120, 116, -155744, 684532, -12]
>
> that has a couple of siblings:
>
> OEIS A186100
> [1, -12, -12, -12, -12, -72, -12, -96, -12, -12, -72, -144]
>
> and
> OEIS A125510
> [1, 6, 6, 42, 6, 36, 42, 48, 6, 150, 36, 72]
>
> I strongly suspect my sequence to also be a theta series, which raises my
> question - is there a way to try and derive it's generating function using
> pari/gp?
No direct support for this, but you can try to recognize them as modular forms:
? m = [1, -12, 116, -12, -1804, 8120, 116, -155744, 684532, -12];
? L = mfsearch([[1..30], 2], m);
? [ print(mfcoefs(f, 11)) | f <- L ];
[1, -12, 116, -12, -1804, 8120, 116, -155744, 684532, -12, 672816, 856096]
\\ single solution in level <= 30 and weight 2.
You may have to input more terms: there are 336 solutions in level <= 300 ...
(31 of which have integer coefficients)
Once you identify the form, in particular its level, you can look for theta
series in the corresponding modular form space [using, e.g., mffromqf and/or
a database of lattices]
Cheers,
K.B.
--
Karim Belabas, IMB (UMR 5251) Tel: (+33) (0)5 40 00 26 17
Universite de Bordeaux Fax: (+33) (0)5 40 00 21 23
351, cours de la Liberation http://www.math.u-bordeaux.fr/~kbelabas/
F-33405 Talence (France) http://pari.math.u-bordeaux.fr/ [PARI/GP]
`