Isometric rigidity of L2-spaces with manifold targets
Abstract
We describe the isometry group of L2(, M) for Riemannian manifolds M of dimension at least two with irreducible universal cover. We establish a rigidity result for the isometries of these spaces: any isometry arises from an automorphism of and a family of isometries of M, distinguishing these spaces from the classical L2(). Additionally, we prove that these spaces lack irreducible factors and that two such spaces are isometric if and only if the underlying manifolds are.
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