Connected components of the ranges of twisted divisor functions on number fields

Abstract

Let r∈C, let K be a finite extension of Q, let IK be the monoid of integral ideals in the ring of integers OK of K, and let χ be a Dirichlet character. Then define the twisted ideal divisor function σr, K, χ : IK → C by σr,K,χ(I) = ΣJ I N(J)-rχ(N(J)), where N denotes the ideal norm. For real r>1, we study the number of connected components Cr, K, χ of the closure σr,K,χ(IK), writing Cr,K when χ is the principal character modulo 1. We prove that Cr,K,χ is finite when χ is real-valued. When K = Q, we show that for fixed r > 1, every sufficiently large positive integer is realized as Cr,Q,χ, and if r is sufficiently large, then every positive integer is realized as χ varies. For finite Galois extensions K over Q, we exhibit new exponential lower bounds for Cr,K, and we prove that for every fixed integer s ≥ 2, the values Cr,K are unbounded as K ranges over degree-s extensions of Q.