On the rationality of the Nielsen zeta function for maps on solvmanifolds
Abstract
In [3,9], the Nielsen zeta function Nf(z) has been shown to be rational if f is a self-map of an infra-solvmanifold of type (R). It is, however, still unknown whether Nf(z) is rational for self-maps on solvmanifolds. In this paper, we prove that Nf(z) is rational if f is a self-map of a (compact) solvmanifold of dimension ≤ 5. In any dimension, we show additionally that Nf(z) is rational if f is a self-map of an NR-solvmanifold or a solvmanifold with fundamental group of the form Zn Z.
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