Matrix-Test Duality: A Support-Function Characterization for C*-Convex Families of CP Maps
Abstract
We develop a matrix-test dual framework for C*-convex families of completely positive maps ( S, T), where S is an operator system and T is a unital C*-algebra. Matrix tests (k,f,s) induce evaluation functionals f(k(s)) and generate a natural weak topology τ=σ( E, F) on E=span C(( S, T)). Our main result provides a support-function/separation characterization of the τ-closed C*-convex hull ( K)\,τ of a family K⊂eq ( S, T) in terms of matrix-test inequalities. A key technical tool is a finite-dimensional folding procedure that compresses finite linear combinations of test functionals into a single higher-level matrix test. As consequences, we obtain a single-test witness for non-membership, support-function criteria for inclusion and equality of τ-closed C*-convex hulls, and, under 0∈( K)\,τ, an exact normalized bipolar-type reconstruction statement. We also show that τ is already generated by level-1 tests, although higher matrix levels remain essential in the geometric test inequalities.
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