Endomorphism rings of toroidal solenoids

Abstract

We study the endomorphism ring End(GA) of a subgroup GA of Qn defined by a non-singular n× n-matrix A with integer entries. In the case when the characteristic polynomial of A is irreducible and an extra assumption holds if n is not prime, we show that End(GA) is commutative and can be identified with a subring of the number field generated by an eigenvalue of A. The obtained results can be applied to studying endomorphisms of associated toroidal solenoids and Zn-odometers. In particular, we build a connection between toroidal solenoids and S-integer dynamical systems, provide a formula for the number of periodic points of a toroidal solenoid endomorphism, and show that the linear representation group of a Zn-odometer is computable.

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