Twisted Burnside-Frobenius theory for endomorphisms of polycyclic groups

Abstract

Let R(φ) be the number of φ-conjugacy (or Reidemeister) classes of an endomorphism φ of a group G. We prove for several classes of groups (including polycyclic) that the number R(φ) is equal to the number of fixed points of the induced map of an appropriate subspace of the unitary dual space G, when R(φ)<∞. Applying the result to iterations of φ we obtain Gauss congruences for Reidemeister numbers. In contrast with the case of automorphisms, studied previously, we have a plenty of examples having the above finiteness condition, even among groups with R∞ property.