Self-adjoint extensions with compact resolvent
Abstract
Let T be a densely defined closed symmetric operator with equal deficiency indices in a separable complex Hilbert space H. In this paper, we prove that T has a self-adjoint extension with compact resolvent if and only if the domain D(T) of T is compactly embedded in H w.r.t. the graph norm on D(T). If it is the case, we also prove that all self-adjoint extensions with compact resolvent can be parameterized by unitary operators U on a certain Hilbert space such that U-Id is compact.
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