Some Representation Theorems for Sesquilinear Forms

Abstract

The possibility of getting a Radon-Nikodym type theorem and a Lebesgue-like decomposition for a non necessarily positive sesquilinear form defined on a vector space D, with respect to a given positive form defined on , is explored. The main result consists in showing that a sesquilinear form is -regular, in the sense that it has a Radon-Nikodym type representation, if and only if it satisfies a sort Cauchy-Schwarz inequality whose right hand side is implemented by a positive sesquilinear form which is -absolutely continuous. In the particular case where is an inner product in D, this class of sesquilinear form covers all standard examples. In the case of a form defined on a dense subspace D of Hilbert space H we give a sufficient condition for the equality (,η)=T|η, with T a closable operator, to hold on a dense subspace of H.