Around the Van Daele--Schm\"udgen theorem

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⊂ H such that M=M=\0\. We show how the existence of such subspaces leads to various pathological properties of unbounded self-adjoint operators related to von Neumann theorems Neumann--Neumann2. We revise the von Neumann-Van Daele-Schm\"udgen assertions Neumann, Daele, 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 Tk⊂ T such that (T* Tk)=\0\ (⇒ Tk2=\0\$) k=1,2 and T1 T2=\0\, T1+ T2= T.