Extensions of dissipative operators with closable imaginary part

Abstract

Given a dissipative operator A on a complex Hilbert space H such that the quadratic form f Im f,Af is closable, we give a necessary and sufficient condition for an extension of A to still be dissipative. As applications, we describe all maximally accretive extensions of strictly positive symmetric operators and all maximally dissipative extensions of a highly singular first-order operator on the interval.