Weyl Law for Schr\"odinger Operators on Noncompact Manifolds, Heat Kernel, and Karamata-Hardy-Littlewood Theorem

Abstract

Building on our earlier work on heat kernel asymptotics for Schr\"odinger-type operators on noncompact manifolds, we establish both the classical and semiclassical Weyl laws for Schr\"odinger operators of the form +V and 2+V on complete noncompact manifolds. While the semiclassical law can be approached via localization, the classical Weyl law has remained widely expected but unproven in this generality. We impose a mild bounded integral oscillation condition on V in addition to the assumptions that V diverges at infinity and satisfies a doubling condition. In this setting, our oscillation condition is sharp and strictly weaker than all previously known assumptions, even in the Euclidean case. A central novelty of our approach is an extended Karamata-Hardy-Littlewood Tauberian theorem, adapted to accommodate non-regularly varying spectral asymptotics in noncompact settings, together with its semiclassical analogue. These Tauberian tools allow us to derive both versions of Weyl's law within a unified framework.

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