On the dimension of invariant measures of endomorphisms of CPk

Abstract

Let f be an endomorphism of CPk and be an f-invariant measure with positive Lyapunov exponents (λ1,\...,λk). We prove a lower bound for the pointwise dimension of in terms of the degree of f, the exponents of and the entropy of . In particular our result can be applied for the maximal entropy measure μ. When k=2, it implies that the Hausdorff dimension of μ is estimated by H μ ≥ d λ1 + d λ2, which is half of the conjectured formula. Our method for proving these results consists in studying the distribution of the -generic inverse branches of fn in CPk. Our tools are a volume growth estimate for the bounded holomorphic polydiscs in CPk and a normalization theorem for the -generic inverse branches of fn.