Reidemeister classes, wreath products and solvability

Abstract

Reidemeister (or twisted conjugacy) classes are considered in restricted wreath products of the form G Zk, where G is a finite group. For an automorphism of finite order (supposed to be the same for the torsion subgroup G and the quotient Zk) with finite number R() of Reidemeister classes, this number is identified with the number of equivalence classes of finite-dimensional unitary irreducible representations of the product that are fixed by the dual homeomorphism (i.e. the so-called conjecture TBFTf is proved in this case). For these groups and automorphisms, we prove the following conjecture: if a finitely generated residually finite group has an automorphism with R()<∞ then it is solvable-by-finite (so-called conjecture R).