A Birman-Krein-Vishik-Grubb theory for sectorial operators

Abstract

We consider densely defined sectorial operators A that can be written in the form A= iS+V with D(A)=D(S)=D(V), where both S and V≥ >0 are assumed to be symmetric. We develop an analog to the Birmin-Krein-Vishik-Grubb (BKVG) theory of selfadjoint extensions of a given strictly positive symmetric operator, where we will construct all maximally accretive extensions AD of A+ with the property that A+⊂ AD⊂ A-*. Here, D is an auxiliary operator from (A-*) to (A+*) that parametrizes the different extensions AD. After this, we will give a criterion for when the quadratic form Re,AD is closable and show that the selfadjoint operator V that corresponds to the closure is an extension of V. We will show how V depends on D, which --- using the classical BKVG-theory of selfadjoint extensions --- will allow us to define a partial order on the real parts of AD depending on D. Applications to second order ordinary differential operators are discussed.