The partition function and elliptic curves
Abstract
For each , we express the partition function as a CM trace on of the discriminant invariants of a weight 0 weak Maass function that records where CM elliptic curves sit on , together with their canonical first-order "CM tangent'', the diagonal local slope of the CM isogeny relation on . In this viewpoint, we obtain a formula for when is inert in as a Brandt-module pairing that is assembled from oriented optimal embeddings of Eichler orders. For and , we obtain a new proof of the Ramanujan congruences where is the unique residue with . The key point is a "bonus valuation" that stems from the fact that the supersingular locus of lies over for This special property, combined with the uniform growth of the -adic valuations of the number of oriented optimal embeddings, explains these congruences. More generally, we give a portable genus 0 template showing that the Watson--Atkin -contraction works uniformly for suitable traces of singular moduli for genus 0 modular curves with
Cite
@article{arxiv.2508.09608,
title = {The partition function and elliptic curves},
author = {Ken Ono},
journal= {arXiv preprint arXiv:2508.09608},
year = {2025}
}
Comments
This version corrects minor errors in valuation bookkeeping