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Conditions for the Existence of SBR Measures for ``Almost Anosov' Diffeomorphisms

Authors:	Huyi Hu

Institution:	Department of Mathematics, University of Maryland, College Park, Maryland 20742

Abstract:	A diffeomorphism of a compact manifold is called ``almost Anosov' if it is uniformly hyperbolic away from a finite set of points. We show that under some nondegeneracy condition, every almost Anosov diffeomorphism admits an invariant measure $\mu$ that has absolutely continuous conditional measures on unstable manifolds. The measure $\mu$ is either finite or infinite, and is called SBR measure or infinite SBR measure respectively. Therefore, $\frac{1}{n} \sum _{i=0}^{n-1}\delta _{f^{i}x}$ tends to either an SBR measure or $\delta _{p}$ for almost every with respect to Lebesgue measure. ( $\delta _{x}$ is the Dirac measure at .) For each case, we give sufficient conditions by using coefficients of the third order terms in the Taylor expansion of at .

Keywords:	Almost Anosov diffeomorphism SBR measure infinite SBR measure local H\"{o}lder condition

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