Dead ends and rationality of complete growth series

Abstract

The complete growth series of a finitely generated group is given by Σn 0 Ansn, where An is the sum of elements of length n in the group semiring. We study the NG-rationality and NG-algebraicity of such series. We show that having dead ends of arbitrarily large depths is an obstruction to NG-rationality. In the case of the 3-dimensional Heisenberg group H3( Z), we prove that the complete series is not NG-algebraic for any generating set. Dead ends are also used to show that complete growth series of higher Heisenberg groups are not NG-rational for specific generating sets. Using a more general version of this obstruction, we prove that complete growth series of some lamplighter groups are not NG-rational either.