On two properties of positively perturbed discrete Schr\"odinger operators
Abstract
We show that if we start from a symmetric lower semi-bounded Schr\"odinger operator H on finitely supported functions on a discrete weighted graph (satisfying certain conditions), apply the Friedrichs construction to get a self-adjoint extension H, and then perturb H by a non-negative function W, then the resulting form-sum H+W coincides with the Friedrichs extension of H+W. Additionally, we consider a non-negative perturbation of an essentially self-adjoint lower semi-bounded Schr\"odinger operator H on a discrete weighted graph. We show that, under certain conditions on the graph and the perturbation, the essential self-adjointness of H remains stable under the given perturbation.
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