On m-sectorial extensions of sectorial operators

Abstract

In our article [15] description in terms of abstract boundary conditions of all m-accretive extensions and their resolvents of a closed densely defined sectorial operator S have been obtained. In particular, if \H,\ is a boundary pair of S, then there is a bijective correspondence between all m-accretive extensions S of S and all pairs Z,X, where Z is a m-accretive linear relation in H and X:dom(Z)ran(SF) is a linear operator such that: \[ \|Xe\|2≤slantRe(Z(e),e)H∀ e∈dom(Z). \] As is well known the operator S admits at least one m-sectorial extension, the Friedrichs extension. In this paper, assuming that S has non-unique m-sectorial extension, we established additional conditions on a pair Z,X guaranteeing that corresponding S is m-sectorial extension of S. As an application, all m-sectorial extensions of a nonnegative symmetric operator in a planar model of two point interactions are described.