Lipschitz-Volume Rigidity and Globalization
Abstract
Let X and Y be length metric spaces. Let Hn denote the n-dimensional Hausdorff measure. The Lipschitz-Volume Rigidity is a property that if there exists a 1-Lipschitz map f X Y and 0< Hn(X)= Hn(f(X))<∞, then f preserves the length of path. This property holds for smooth manifolds but doesn't hold for all singular spaces. We survey the Lipschitz-Volume Rigidity Theorems on singular spaces with lower curvature bounds and discuss some related open problems.
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