Crossed products of operator spaces
Abstract
Let V be an operator space and (V) be the group of all completely isometric bijective linear mappings on V. Let G act on V via a strongly continuous group homomorphism α:G (V). We define the full (and reduced) operator space crossed product Vα,(r)G and show that for a C*-algebra with its canonical operator space structure, it coincides with the corresponding C*-algebra crossed product. Unfortunately, the proof of Theorem 4.3 of the paper contains a serious gap, which leads to the withdrawal of the paper.
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