Rank one HCIZ at high temperature: interpolating between classical and free convolutions
Abstract
We study the rank one Harish-Chandra-Itzykson-Zuber integral in the limit where N β2 c , called the high temperature regime and show that it can be used to construct a promising one-parameter interpolation, with parameter c between the classical and the free convolution. This c-convolution has a simple interpretation in terms of another associated family of distribution indexed by c, called the Markov-Krein transform: the c-convolution of two distributions corresponds to the classical convolution of their Markov-Krein transforms. We derive first cumulants-moments relations, a central limit theorem, a Poisson limit theorem and shows several numerical examples of c-convoluted distributions.
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