Non-perfect pairings between Hecke algebra and modular forms over function fields
Abstract
We study two analogs, for modular forms over , of the pairing between Hecke algebra and cusp forms given by the first coefficient in the expansion. For Drinfeld modular forms, the -pairing is provided by the first coefficient of their -expansion at infinity. For -valued harmonic cochains, the -pairing is given by their Fourier coefficient with respect to the trivial ideal. We prove that, contrarily to classical cusp forms, both pairings in weight are not perfect in a quite general setting, namely for the congruence subgroup with any prime ideal in of degree . We show it by exhibiting a common element of the Hecke algebra in the kernels of both pairings and proving that it is non-zero using computations with modular symbols over . Finally we present computational data on other kernel elements of these pairings.
Cite
@article{arxiv.2408.11473,
title = {Non-perfect pairings between Hecke algebra and modular forms over function fields},
author = {Cécile Armana},
journal= {arXiv preprint arXiv:2408.11473},
year = {2024}
}