Connected essential spectrum: the case of differential forms
Abstract
In this article we prove that, over complete manifolds of dimension n with vanishing curvature at infinity, the essential spectrum of the Hodge Laplacian on differential k-forms is a connected interval for 0≤ k≤ n. The main idea is to show that large balls of these manifolds, which capture their spectrum, are close in the Gromov-Hausdorff sense to product manifolds. We achieve this by carefully describing the collapsed limits of these balls. Then, via a new generalized version of the classical Weyl criterion, we demonstrate that very rough test forms that we get from the -approximation maps can be used to show that the essential spectrum is a connected interval. We also prove that, under a weaker condition where the Ricci curvature is asymptotically nonnegative, the essential spectrum on k-forms is [0,∞), but only for 0≤ k≤ q and n-q ≤ k≤ n for some integer q≥ 1 which depends the structure of the manifolds at infinity.
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