Essential self-adjointness of non-semibounded Schr\"odinger operators on infinite graphs

Abstract

We work in the setting of infinite, not necessarily locally finite, weighted graphs. We give a sufficient condition for the essential self-adjointness of (discrete) Schr\"odinger operators LV that are not necessarily lower semi-bounded. As a corollary of the main result, we show that LV is essentially self-adjoint if the potential V satisfies V(x)≥ -b1-b2[(0,x)]2, for all vertices x, where o is a fixed vertex, b1 and b2 are non-negative constants, and is an intrinsic metric of finite jump size, such that the restriction of the weighted vertex degree to every ball corresponding to is bounded (not necessarily uniformly bounded).

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