Multifractal Analysis of Equilibrium States of Endomorphisms of Pk

Abstract

Let f be a holomorphic endomorphism of CPk of algebraic degree at least 2 and let X ⊂eq CPk be an uniformly expanding set. In this paper, we study multifractal analysis of equilibrium states of H\"older continuous functions for the non-conformal dynamical system f : X X. In lieu of Hausdorff dimensions, we use a new dimension theory (i.e., the volume dimension theory) to define various local dimension multifractal spectra and show that each of these spectra form a Legendre transform pair with the temperature function as in the conformal case. As an application of our main theorems, we also prove a conditional variational principle for such dimension multifractal spectra.

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