Linearization of topologically Anosov homeomorphisms of non compact surfaces
Abstract
We study the dynamics of Topologically Anosov homeomorphisms of non compact surfaces. In the case of surfaces of genus zero and finite type, we classify them. We prove that if f:S S, is a Topologically Anosov homeomorphism where S is a non-compact surface of genus zero and finite type, then S= 2 and f is conjugate to a homothety or reverse homothety (depending on wether f preserves or reverses orientation). A weaker version of this result was conjectured in a previous work.
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