Off-diagonal terms in symmetric operators

Abstract

In this paper we provide a quantitative comparison of two obstructions for a given symmetric operator S with dense domain in Hilbert space H to be selfadjoint. The first one is the pair of deficiency spaces of von Neumann, and the second one is of more recent vintage: Let P be a projection in H. We say that it is smooth relative to S if its range is contained in the domain of S. We say that smooth projections \Pi \i=1∞ diagonalize S if (a) (I-Pi)SPi=0 for all i, and (b) iPi=I. If such projections exist, then S has a selfadjoint closure (i.e., S has a spectral resolution), and so our second obstruction to selfadjointness is defined from smooth projections Pi with (I-Pi)SPi ≠ 0. We prove results both in the case of a single operator S and a system of operators.

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