A Survey on Solvable Sesquilinear Forms

Abstract

The aim of this paper is to present a unified theory of many Kato type representation theorems in terms of solvable forms on Hilbert spaces. In particular, for some sesquilinear forms on a dense domain D one looks for an expression (,η)= T , η, ∀ ∈ D(T),η ∈ D, where T is a densely defined closed operator with domain D(T)⊂eq D. There are two characteristic aspects of solvable forms. Namely, one is that the domain of the form can be turned into a reflexive Banach space need not be a Hilbert space. The second one is the existence of a perturbation with a bounded form which is not necessarily a multiple of the inner product.