Almost-idempotent quantum channels and approximate C*-algebras

Abstract

Let be a unital completely positive (UCP) map on the space of operators on some Hilbert space. We assume that is η-idempotent, namely, \|2-\|cb η, and construct an associated -C* algebra (of almost-invariant observables) for =O(η). This type of structure has the axioms of a unital C* algebra but the associativity and other axioms involving the multiplication and the unit hold up to . We prove that any finite-dimensional -C* algebra A is O()-isomorphic to some genuine C* algebra B. These bounds are universal, i.e. do not depend on the dimensionality or other parameters. When A comes from a finite-dimensional η-idempotent UCP map , the O(η)-isomorphism and its inverse can be realized by UCP maps. This gives an approximate factorization of the quantum channel * into a decoding channel, producing a state on B, and an encoding channel.

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