Free denoising via overlap measures and c-freeness techniques

Abstract

We study the problem of free denoising. For free selfadjoint random variables a,b, where we interpret a as a signal and b as noise, we find E(a|a+b). To that end, we study a probability measure μ( ov )a,a+b on R2 which we call the overlap measure. We show that μ( ov )a,a+b is absolutely continuous with respect to the product measure μa× μa+b. The Radon-Nikodym derivative gives direct access to E(a|a+b). We show that analogous results hold in the case of multiplicative noise when a,b are positive and the aim is to find E(a|a1/2ba1/2). In a parallel development we show that, for a general selfadjoint expression P(a,b) made with a and b, finding E(a|P(a,b)) is equivalent to finding the distribution of P(a,b) in a certain two-state probability space (A,,), where a,b are c-free with respect to (,) in the sense of Bo\.zejko-Leinert-Speicher. We discuss how free denoising (which is set in the framework of an abstract W*-probability space) relates to the notion of ''matrix denoising'' previously discussed in the random matrix literature.

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