Entropy of meromorphic maps acting on analytic sets

Abstract

Let f : X X be a dominating meromorphic map on a compact K\"ahler manifold X of dimension k. We extend the notion of topological entropy hltop(f) for the action of f on (local) analytic sets of dimension 0≤ l ≤ k. For an ergodic probability measure , we extend similarly the notion of measure-theoretic entropy hl(f). Under mild hypothesis, we compute hltop(f) in term of the dynamical degrees of f. In the particular case of endomorphisms of P2 of degree d, we show that h1top(f)= d for a large class of maps but we give examples where h1top(f)≠ d.