Lieb--Thirring inequalities on manifolds with constant negative curvature
Abstract
In this short note we prove Lieb--Thirring inequalities on manifolds with negative constant curvature. The discrete spectrum appears below the continuous spectrum (d-1)2/4, ∞), where d is the dimension of the hyperbolic space. As an application we obtain a P\'olya type inequality with not a sharp constant. An example of a 2D domain is given for which numerical calculations suggest that the P\'olya inequality holds for it.
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