Distributions of Iwasawa λ-invariants of Zp-towers over supersingular isogeny graphs

Abstract

A graph-theoretic analogue of Iwasawa theory, initiated by Gonet and Vallières, has attracted considerable interest in the study of Iwasawa invariants. On the other hand, for a pair of prime numbers (r,), one obtains a graph, called the supersingular -isogeny graph (SIG), whose adjacency matrix has eigenvalues given by the -th Fourier coefficients of the weight 2 Eisenstein series and newforms of level r. In this paper, we fix prime numbers r and p, and let vary over infinitely many primes. We then investigate the distribution of the Iwasawa λ-invariants of the constant Zp-towers over the SIGs, thereby revealing connections among graph theory, Iwasawa theory, elliptic curves, and the Galois representations attached to newforms. At the end of this paper, we propose a conjecture concerning the Galois orbits of newforms.