English

Around the Van Daele--Schm\"udgen theorem

Functional Analysis 2013-12-24 v1

Abstract

For a {bounded} non-negative self-adjoint operator acting in a complex, infinite-dimensional, separable Hilbert space H and possessing a dense range R we propose a new approach to characterisation of phenomenon concerning the existence of subspaces M\subset H such that M\capR=M^\perp\capR=\{0\}. We show how the existence of such subspaces leads to various {pathological} properties of {unbounded} self-adjoint operators related to von Neumann theorems \cite{Neumann}--\cite{Neumann2}. We revise the von Neumann-Van Daele-Schm\"udgen assertions \cite{Neumann}, \cite{Daele}, \cite{schmud} to refine them. We also develop {a new systematic approach, which allows to construct for any {unbounded} densely defined symmetric/self-adjoint operator T infinitely many pairs of its closed densely defined restrictions T_k\subset T such that \dom(T^* T_{k})=\{0\} (\Rightarrow \dom T_{k}^2=\{0\}$) k=1,2 and \dom T_1\cap\dom T_2=\{0\}, \dom T_1\dot+\dom T_2=\dom T.

Keywords

Cite

@article{arxiv.1312.6502,
  title  = {Around the Van Daele--Schm\"udgen theorem},
  author = {Yury Arlinskii and Valentin Zagrebnov},
  journal= {arXiv preprint arXiv:1312.6502},
  year   = {2013}
}
R2 v1 2026-06-22T02:33:54.173Z