Isomorphisms of Hilbert C*-Modules and *-Isomorphisms of Related Operator C*-Algebras

Abstract

Let M be a Banach C*-module over a C*-algebra A carrying two A-valued inner products < .,. >1, <.,. >2 which induce equivalent to the given one norms on M. Then the appropriate unital C*-algebras of adjointable bounded A-linear operators on the Hilbert A-modules \ M, < .,. >1 \ and \ M, < .,. >2 \ are shown to be *-isomorphic if and only if there exists a bounded A-linear isomorphism S of these two Hilbert A-modules satisfying the identity < .,. >2 < S(.),S(.) >1. This result extends other equivalent descriptions due to L.~G.~Brown, H.~Lin and E.~C.~Lance. An example of two non-isomorphic Hilbert C*-modules with *-isomorphic C*-algebras of ''compact''/adjointable bounded module operators is indicated.

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