Denseness of zero entropy aperiodic ergodic measures

Abstract

We study partially hyperbolic homoclinic classes of C1-generic diffeomorphisms with a one-dimensional central bundle, so that the central Lyapunov exponent c(μ) is well defined for any ergodic measure μ supported on the class. We focus on nonhyperbolic homoclinic classes supporting ergodic measures with positive, zero, and negative central exponents. For each α and a nontrivial homoclinic class H of a C1-generic diffeomorphism f, we consider the level set of measures \[ Mαerg(f,H)= \μ ergodic, supported on H, with c(μ)=α \. \] In this generic setting, the range of α for which Mαerg(f,H) is nonempty forms a nontrivial closed interval I. Since the set of periodic measures is countable, most of these sets contain no periodic measures. We show that for every α in the interior of I, the so-called Axiomatized GIKN measures, a class of low-complexity, zero-entropy measures, are dense in Mαerg(f,H). This result can be viewed as an analogue of Sigmund's classical density of periodic measures for systems with the specification property, obtained here in a setting where the specification property does not hold and periodic measures are typically absent (in the considered level sets). We also present a similar result for the open class of blender-minimal diffeomorphisms, contained in the class of C1-robustly transitive ones.

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