Orthogonality preserving property for pairs of operators on Hilbert C*-modules

Abstract

We investigate the orthogonality preserving property for pairs of mappings on inner product C*-modules extending existing results for a single orthogonality-preserving mapping. Guided by the point of view that the C*-valued inner product structure of a Hilbert C*-module is determined essentially by the module structure and by the orthogonality structure, pairs of linear and local orthogonality-preserving mappings are investigated, not a priori bounded. The intuition is that most often C*-linearity and boundedness can be derived from the settings under consideration. In particular, we obtain that if A is a C*-algebra and T, S:E F are two bounded A-linear mappings between full Hilbert A-modules, then x, y = 0 implies T(x), S(y) = 0 for all x, y∈ E if and only if there exists an element γ of the center Z(M( A)) of the multiplier algebra M( A) of A such that T(x), S(y) = γ x, y for all x, y∈ E. In particular, for adjointable operators S we have T=(S*)-1, and any bounded invertible module operator T may appear. Varying the conditions on the mappings T and S we obtain further affirmative results for local operators and for pairs of a bounded and of an unbounded module operator with bounded inverse, among others. Also, unbounded operators with disjoint ranges are considered. The proving techniques give new insights.