Bounded modular functionals and operators on Hilbert C*-modules that are regular
Abstract
We find first structural background information about the reasons that for any C*-algebra A and any two Hilbert A-modules M ⊂eq N with M=\0\, every bounded A-linear map N A (or N N) vanishing on M might be only the zero map. The self-adjoint case is proved, whereas the general case is open with partial insights. Unfortunately, the proof of Lemma 3.3 of our first version contains the implicit assumption that the projection P and the operator S commute, which is not the case for non-zero non-self-adjoint operators S.
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