Entropy-Minimizing Diffeomorphisms on a G2-Manifold

Abstract

In this paper, we construct infinitely many diffeomorphisms of a Joyce manifold M which achieve Yomdin's homological lower bound for topological entropy, imitating a recent construction of Farb-Looijenga for K3 surfaces. Moreover, following a recent paper by Crowley-Goette-Hertl, we show these diffeomorphisms act freely on a connected component of the Teichm\"uller space of G2 structures on M, and hence that the homotopy moduli space of G2 structures on M has infinite fundamental group. We also discuss a putative analogy between dynamics on a G2 manifold and that of an algebraic surface, and prove a theorem about its limitations.