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Oct
26 |
awarded | Nice Question |
Oct
25 |
comment |
Computing millions of coefficients of non self-dual modular forms
@DavidLoeffler Thanks for comment. I should have been more explicit. We are ultimately in computing L-functions and quadratic twists of elliptic curves, for example, leave us with L-functions L-functions whose conductors are restricted to be of a certain form. |
Oct
25 |
comment |
Computing millions of coefficients of non self-dual modular forms
@JeremyRouse: an example with a quadratic character would be fine. |
Oct
25 |
comment |
Computing millions of coefficients of non self-dual modular forms
@WatsonLadd: I'm using the standard modular symbols algorithms. |
Oct
24 |
awarded | Student |
Oct
24 |
asked | Computing millions of coefficients of non self-dual modular forms |
May
29 |
awarded | Yearling |
Jan
10 |
comment |
Motivic interpretation of genus 2 Siegel forms induced by lifts of Maass and Skoruppa
I'm not sure what you mean by "more systematic" but maybe <a href="www2.math.ou.edu/~rschmidt/papers/skclass.pdf">this paper</a> by Ralf Schmidt might be what you're interested in. |
Jan
5 |
comment |
Mathematical research published in the form of poems
My understanding is that there is no prose in Sanskrit. When I studied the language in college, we read encyclopedias and histories and they, at least, were written in verse. |
Oct
17 |
awarded | Fanatic |
Mar
6 |
awarded | Editor |
Mar
6 |
revised |
Reference on generators of subgroups of symplectic groups
deleted 10 characters in body; added 3 characters in body |
Mar
5 |
answered | Reference on generators of subgroups of symplectic groups |
Dec
2 |
comment |
What happens to $\zeta(s)$ when all its $\Im(\rho_n)$ are “scaled” linearly?
For more zeta zeros check out lmfdb.org/zeros/zeta There are over 36 million there. |
Oct
5 |
answered | Modularity of higher dimensional abelian varieties |
Sep
23 |
awarded | Enthusiast |
Aug
3 |
awarded | Supporter |
Jul
23 |
comment |
Are there cusp forms for the full modular group Sp(2,Z) and representations det^3 \otimes Sym^2j(\rho_standard)
I wrote to Kiyuna and he tells me that there are 18 generators: 6 of them are theta series (presumably products of theta constants) and the remaining 12 are a kind of Rankin-Cohen construction. I don't know much more but he tells me there will be a preprint in the next couple of weeks. If you'd like to send me an email (see my website for my email address), I can give you his email address. |
Jul
19 |
awarded | Teacher |
Jul
19 |
answered | Are there cusp forms for the full modular group Sp(2,Z) and representations det^3 \otimes Sym^2j(\rho_standard) |