Perturbation of the Wigner equation in inner product C*-modules

Abstract

Let be a C*-algebra and be a von Neumann algebra that both act on a Hilbert space . Let and be inner product modules over and , respectively. Under certain assumptions we show that for each mapping f M N satisfying \||f(x)f(y)|-|xy| \|≤φ(x,y) (x,y∈ M), where φ is a control function, there exists a solution I M N of the Wigner equation |I(x)I(y)|=|xy| (x, y ∈ M) such that \|f(x)-I(x)\|≤φ(x,x) (x∈ M).