Hamana's injective envelope as a maximal rigid multiplier cover
Abstract
Let A be a unital C*-algebra. We call an A-multiplier cover a pair (E,) consisting of a C*-algebra E and a faithful non-degenerate *-homomorphism A M(E). Ordering such covers by A-preserving unital completely positive maps between multiplier algebras, we study those covers for which the inclusion A⊂eq M(E) is rigid in Hamana's sense. We prove that Hamana's injective envelope I(A) is a maximal rigid A-multiplier cover and that, conversely, a rigid cover is maximal if and only if its multiplier algebra is canonically *-isomorphic to I(A) over A. Thus maximal rigid multiplier covers provide an order-theoretic characterisation of the injective envelope. In the commutative case A=C(X), this recovers the familiar realisation I(C(X)) C(G(X)) M(C0(U)) for a dense cozero set U in the Gleason cover G(X), in a form inspired by Baszczyk's concise construction of the Gleason cover.
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