English

Rational eigenfunctions of the Hecke operators

Number Theory 2024-08-22 v2

Abstract

We study the action of the Hecke operators UnU_n on the space R\mathcal R of rational functions in one variable, over C\mathbb C. The main goal is to give a complete classification of the eigenfunctions of UnU_n. We accomplish this by introducing certain number-theoretic directed graphs, called Zolotarev Graphs, which extend the well-known permutations due to Zolotarev. We develop the theory of these Zolotarev graphs, using them to decompose the eigenfunctions of UnU_n into certain natural finite-dimensional vector spaces of rational functions, which we call the eigenspaces. In this context, we prove that the dimension of each eigenspace is equal to the number of nodes of a cycle that belongs to its corresponding Zolotarev graph. We prove that the number of leaves of this Zolotarev graph equals the dimension of the kernel of UnU_n. We then give a novel number-theoretic formula for the number of cycles of fixed length, in each Zolotarev graph. We also study the simultaneous eigenfunctions for all of the UnU_n, and give explicit bases for all of them. In the process, we answer many questions that were set out in the work of Gil and Robins (2005). We also discover certain strong relations between these graphs and the kernel of UnU_n acting on a subspace of R\mathcal R; in particular, we give several equivalent conditions for the diagonalizibility of UnU_n. Finally, we prove that the classical Artin Conjecture on primitive roots is equivalent to a new conjecture here, that infinitely many of these eigenspaces have dimension 11.

Keywords

Cite

@article{arxiv.2406.15744,
  title  = {Rational eigenfunctions of the Hecke operators},
  author = {André Rosenbaum Coelho and Caio Simon de Oliveira and Sinai Robins},
  journal= {arXiv preprint arXiv:2406.15744},
  year   = {2024}
}

Comments

37 pages, 9 figures

R2 v1 2026-06-28T17:15:44.689Z