Nonlinear completely positive maps and dilation theory for real involutive algebras

Abstract

A real seminormed involutive algebra is a real associative algebra A endowed with an involutive antiautomorphism * and a submultiplicative seminorm p with p(a*) =p(a) for a∈ A. Then ball( A,p) := \a ∈ A p(a) < 1\ is an involutive subsemigroup. For the case where A is unital, our main result asserts that a function φ ball( A,p) B(V), V a Hilbert space, is completely positive (defined suitably) if and only if it is positive definite and analytic for any locally convex topology for which ball( A,p) is open. If η A A C*( A,p) is the enveloping C*-algebra of ( A,p) and eC*( A,p) is the c0-direct sum of the symmetric tensor powers Sn(C*( A,p)), then the above two properties are equivalent to the existence of a factorization φ = , where eC*( A,p) B(V) is linear completely positive and (a) = Σn = 0∞ η A(a) n. We also obtain a suitable generalization to non-unital algebras. An important consequence of this result is a description of the unitary representations of U( A) with bounded analytic extensions to ball( A,p) in terms of representations of the C*-algebra eC*( A,p).