Generalized inverses and polar decomposition of unbounded regular operators on Hilbert C*-modules

Abstract

In this note we show that an unbounded regular operator t on Hilbert C*-modules over an arbitrary C* algebra A has polar decomposition if and only if the closures of the ranges of t and |t| are orthogonally complemented, if and only if the operators t and t* have unbounded regular generalized inverses. For a given C*-algebra A any densely defined A-linear closed operator t between Hilbert C*-modules has polar decomposition, if and only if any densely defined A-linear closed operator t between Hilbert C*-modules has generalized inverse, if and only if A is a C*-algebra of compact operators.