Adjointability of densely defined closed operators and the Magajna-Schweizer Theorem

Abstract

In this notes unbounded regular operators on Hilbert C*-modules over arbitrary C*-algebras are discussed. A densely defined operator t possesses an adjoint operator if the graph of t is an orthogonal summand. Moreover, for a densely defined operator t the graph of t is orthogonally complemented and the range of PFPG(t) is dense in its biorthogonal complement if and only if t is regular. For a given C*-algebra A any densely defined A-linear closed operator t between Hilbert C*-modules is regular, if and only if any densely defined A-linear closed operator t between Hilbert C*-modules admits a densely defined adjoint operator, if and only if A is a C*-algebra of compact operators. Some further characterizations of closed and regular modular operators are obtained. Changes 1: Improved results, corrected misprints, added references. Accepted by J. Operator Theory, August 2007 / Changes 2: Filled gap in the proof of Thm. 3.1, changes in the formulations of Cor. 3.2 and Thm. 3.4, updated references and address of the second author.