Reidemeister classes in lamplighter type groups

Abstract

We prove that for any automorphism φ of the restricted wreath product Z2 wr Zk and Z3 wr Z2d the Reidemeister number R(φ) is infinite, i.e. these groups have the property R∞. For Z3 wr Z2d+1 and Zp wr Zk, where p>3 is prime, we give examples of automorphisms with finite Reidemeister numbers. So these groups do not have the property R∞. For these groups and Zm wr Z, where m is relatively prime to 6, we prove the twisted Burnside-Frobenius theorem (TBFTf): if R(φ)<∞, then it is equal to the number of equivalence classes of finite-dimensional irreducible unitary representations fixed by the action [] [φ].