On C-Symmetric and C-Self-adjoint Unbounded Operators on Hilbert Space
Abstract
Let C be a conjugation on a Hilbert space H. A densely defined linear operator A on H is called C-symmetric if CAC⊂eq A* and C-self-adjoint if CAC=A*. Our main results describe all C-self-adjoint extensions of A on H. Further, we prove a C-self-adjointness criterion based on quasi-analytic vectors and we characterize C-self-adjoint operators in terms of their polar decompositions.
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