Symmetric Rigidity for Circle Endomorphisms with Bounded Geometry

Abstract

Let f and g be two circle endomorphisms of degree d≥ 2 such that each has bounded geometry, preserves the Lebesgue measure, and fixes 1. Let h fixing 1 be the topological conjugacy from f to g. That is, h f=g h. We prove that h is a symmetric circle homeomorphism if and only if h=Id. Many other rigidity results in circle dynamics follow from this very general symmetric rigidity result.

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