Zero entropy automorphisms of compact K\"ahler manifolds and dynamical filtrations

Abstract

We study zero entropy automorphisms of a compact K\"ahler manifold X. Our goal is to bring to light some new structures of the action on the cohomology of X, in terms of the so-called dynamical filtrations on H1,1(X, R). Based on these filtrations, we obtain the first general upper bound on the polynomial growth of the iterations (gm)* \, \, H2(X, C) where g is a zero entropy automorphism, in terms of dim \, X only. We also give an upper bound for the (essential) derived length ess(G, X) for every zero entropy subgroup G, again in terms of the dimension of X only. We propose a conjectural upper bound for the essential nilpotency class c ess(G,X) of a zero entropy subgroup G. Finally, we construct examples showing that our upper bound of the polynomial growth (as well as the conjectural upper bound of c ess(G,X)) are optimal.