On the support of measures of large entropy for automorphisms of Kähler manifolds

Abstract

Let f be a holomorphic automorphism of a compact Kähler manifold X with simple action on cohomology. We show that every ergodic measure with sufficiently large entropy is supported on the Julia set of f. In particular, when X is a surface, any ergodic measure with positive entropy is supported on the Julia set. The proof relies on quantitative estimates for the speed of convergence towards the Green currents of f, with respect to a suitable norm on an adapted functional space of non-necessarily closed currents.