The Reidemeister spectrum of finite abelian groups
Abstract
For a finite abelian group A, the Reidemeister number of an endomorphism equals the size of Fix(), the set of fixed points of . Consequently, the Reidemeister spectrum of A is a subset of the set of divisors of |A|. We fully determine the Reidemeister spectrum of |A|, that is, which divisors of |A| occur as the Reidemeister number of an automorphism. To do so, we discuss and prove a more general result providing upper and lower bounds on the number of fixed points of automorphisms related to a given automorphism .
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