Factorization tests and algorithms arising from counting modular forms and automorphic representations
Abstract
A theorem of Gekeler compares the number of non-isomorphic automorphic representations associated with the space of cusp forms of weight on to a simpler function of and , showing that the two are equal whenever is squarefree. We prove the converse of this theorem (with one small exception), thus providing a characterization of squarefree integers. We also establish a similar characterization of prime numbers in terms of the number of Hecke newforms of weight on . It follows that a hypothetical fast algorithm for computing the number of such automorphic representations for even a single weight would yield a fast test for whether is squarefree. We also show how to obtain bounds on the possible square divisors of a number that has been found to not be squarefree via this test, and we show how to probabilistically obtain the complete factorization of the squarefull part of from the number of such automorphic representations for two different weights. If in addition we have the number of such Hecke newforms for even a single weight , then we show how to probabilistically factor entirely. All of these computations could be performed quickly in practice, given the number(s) of automorphic representations and modular forms as input.
Cite
@article{arxiv.1709.02411,
title = {Factorization tests and algorithms arising from counting modular forms and automorphic representations},
author = {Miao Gu and Greg Martin},
journal= {arXiv preprint arXiv:1709.02411},
year = {2018}
}
Comments
15 pages. The original version of this manuscript was entitled "A characterization of squarefree numbers using automorphic representations"; the title has been changed to reflect additional theorems contained in the current version