Normal extensions
Abstract
Let L0 be a densely defined minimal linear operator in a Hilbert space H. We prove theorem that if there exists at least one correct extension LS of L0 with the property D(LS)=D(LS*), then we can describe all correct extensions L with the property D(L)=D(L*). We also prove that if L0 is formally normal and there exists at least one correct normal extension LN, then we can describe all correct normal extensions L of L0. As an example, the Cauchy-Riemann operator is given.
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