Twisted Conjugacy in Direct Products of Groups
Abstract
Given a group G and an endomorphism of G, two elements x, y ∈ G are said to be -conjugate if x = gy (g)-1 for some g ∈ G. The number of equivalence classes for this relation is the Reidemeister number R() of . The set \R() ∈ Aut(G)\ is called the Reidemeister spectrum of G. We investigate Reidemeister numbers and spectra on direct products of finitely many groups and determine what information can be derived from the individual factors.
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