Hearing the Serre invariant of a compact p-adic analytic manifold

Abstract

Using a previous novel way of defining kernel functions for Laplacian integral operators on a compact p-adic analytic manifold X, one such operator 0s with s∈R is applied to hearing the Serre invariant i(X) by showing that a wavelet eigenvalue is always congruent to i(X) modulo q-1, where q is the cardinality of the residue field k attached to a p-adic number field K. It is shown how the number of k-rational points of the special fibre of the N\'eron model of an elliptic curve defined over K relates to the wavelet spectrum of s0, and this then leads to the realisation that the Serre invariant i(E(X)) in the case of an elliptic curve E with split multiplicative reduction vanishes modulo q-1.

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