A Ruelle-McMullen formula for the volume dimension of skew products in C2

Abstract

Ruelle gave an explicit second-order expansion at c=0 of the Hausdorff dimension of the Julia set of the quadratic family fc(z)=z2+c. McMullen later extended this result to polynomial perturbations of zd for arbitrary degree d≥ 2. In this paper we study an analogue of this problem for skew products in C2. Since holomorphic dynamical systems in higher dimensions are non-conformal, we replace the Hausdorff dimension by the volume dimension, a dynamically defined notion we introduced in our earlier work and characterized as the zero of a natural pressure function. We consider families of holomorphic skew products of the form \[ ft(z,w)=(zd, wd+t(c1 (z) wd-1 +c2(z)wd-2 + ·s+cd(z))). \] Our main result gives an explicit second-order expansion of the volume dimension of the Julia set J(ft) as t0 in terms of the coefficients ck(z).

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