Unbounded Operators on Hilbert C*-Modules

Abstract

Let E and F be Hilbert C*-modules over a C*-algebra A. New classes of (possibly unbounded) operators t:E F are introduced and investigated. Instead of the density of the domain (t) we only assume that t is essentially defined, that is, (t)=\0\. Then t has a well-defined adjoint. We call an essentially defined operator t graph regular if its graph (t) is orthogonally complemented in E F and orthogonally closed if (t)=(t). A theory of these operators is developed. Various characterizations of graph regular operators are given. A number of examples of graph regular operators are presented (E=C0(X), a fraction algebra related to the Weyl algebra, Toeplitz algebra, Heisenberg group). A new characterization of affiliated operators with a C*-algebra in terms of resolvents is given.