English

Adjoint Pairs and Unbounded Normal Operators

Functional Analysis 2021-11-29 v2

Abstract

An adjoint pair is a pair of densely defined linear operators A,BA, B on a Hilbert space such that Ax,y=x,By\langle Ax,y\rangle=\langle x,By\rangle for x\cD(A),y\cD(B).x\in \cD(A), y \in \cD(B). We consider adjoint pairs for which 00 is a regular point for both operators and associate a boundary triplet to such an adjoint pair. Proper extensions of the operator BB are in one-to-one correspondence T\cC\cCT_\cC\leftrightarrow \cC to closed subspaces \cC\cC of \cN(A)\cN(B)\cN(A^*)\oplus\cN(B^*). In the case when BB is formally normal and \cD(A)=\cD(B)\cD(A)=\cD(B), the normal operators T\cCT_\cC are characterized. Next we assume that BB has an extension to a normal operator with bounded inverse. Then the normal operators T\cCT_\cC are described and the case when \cN(A)\cN(A^*) has dimension one is treated.

Keywords

Cite

@article{arxiv.2110.06540,
  title  = {Adjoint Pairs and Unbounded Normal Operators},
  author = {Konrad Schmüdgen},
  journal= {arXiv preprint arXiv:2110.06540},
  year   = {2021}
}

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R2 v1 2026-06-24T06:51:05.615Z