Boundedness of Pseudodifferential Operators of C*-Algebra-Valued Symbol

Abstract

Let us consider the set SA(n) of rapidly decreasing functions G:n A, where A is a separable C*-algebra. We prove a version of the Calder\'on-Vaillancourt theorem for pseudodifferential operators acting on SA(n) whose symbol is A-valued. Given a skew-symmetric matrix, J, we prove that a pseudodifferential operator that commutes with G(x+JD), G∈ SA(n), is of the form F(x-JD), for F a C∞-function with bounded derivatives of all orders.

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