From the Choi Formalism in Infinite Dimensions to Unique Decompositions of Generators of Completely Positive Dynamical Semigroups

Abstract

Given any separable complex Hilbert space, any trace-class operator B which does not have purely imaginary trace, and any generator L of a norm-continuous one-parameter semigroup of completely positive maps we prove that there exists a unique bounded operator K and a unique completely positive map such that (i) L=K(·)+(·)K*+, (ii) the superoperator (B*(·)B) is trace class and has vanishing trace, and (iii) tr(B*K) is a real number. Central to our proof is a modified version of the Choi formalism which relates completely positive maps to positive semi-definite operators. We characterize when this correspondence is injective and surjective, respectively, which in turn explains why the proof idea of our main result cannot extend to non-separable Hilbert spaces. In particular, we find examples of positive semi-definite operators which have empty pre-image under the Choi formalism as soon as the underlying Hilbert space is infinite-dimensional.