Factorized sectorial relations, their maximal sectorial extensions, and form sums

Abstract

In this paper sectorial operators, or more generally, sectorial relations and their maximal sectorial extensions in a Hilbert space H are considered. The particular interest is in sectorial relations S, which can be expressed in the factorized form \[ S=T*(I+iB)T or S=T(I+iB)T*, \] where B is a bounded selfadjoint operator in a Hilbert space K and T: H K or T: K H, respectively, is a linear operator or a linear relation which is not assumed to be closed. Using the specific factorized form of S, a description of all the maximal sectorial extensions of S is given with a straightforward construction of the extreme extensions SF, the Friedrichs extension, and SK, the Kren extension of S, which uses the above factorized form of S. As an application of this construction the form sum of maximal sectorial extensions of two sectorial relations is treated.