The Nielsen numbers of iterations of maps on infra-solvmanifolds of type R and periodic points

Abstract

We study the asymptotic behavior of the sequence of the Nielsen numbers \N(fk)\, the essential periodic orbits of f and the homotopy minimal periods of f by using the Nielsen theory of maps f on infra-solvmanifolds of type R. We give a linear lower bound for the number of essential periodic orbits of such a map, which sharpens well-known results of Shub and Sullivan for periodic points and of Babenko and Bogatyi for periodic orbits. We also verify that a constant multiple of infinitely many prime numbers occur as homotopy minimal periods of such a map.