An upper bound for polynomial volume growth of automorphisms of zero entropy

Abstract

Let X be a normal projective variety of dimension d over an algebraically closed field and f an automorphism of X. Suppose that the pullback f*|N1(X)R of f on the real Néron--Severi space N1(X)R is unipotent and denote the index of the eigenvalue 1 by k+1. We establish the following upper bound for the polynomial volume growth plov(f) of f: \[ plov(f) (k/2 + 1)d. \] This inequality is optimal in certain cases. Moreover, we prove that k 2(d-1), extending a result of Dinh--Lin--Oguiso--Zhang for compact Kähler manifolds to arbitrary characteristic. By combining these two inequalities, we obtain the optimal bound \[ plov(f) d2, \] that affirmatively answers the questions of Cantat--Paris-Romaskevich and Lin--Oguiso--Zhang.