An explicit example for the high temperature convolution: crossover between the binomial law B(2,1/2) and the arcsine law
Abstract
In this note, we study the high-temperature convolution introduced in Ref.\ mergnycconv, between two symmetric Bernoulli distributions. We give an analytical expression for both the Stieltjes transform and the density. This result provides the first non-trivial expression for the high-temperature convolution of two distributions and gives a new family of densities, interpolating between the centered binomial distribution with number of trials n=2 and probability of success p=1/2, and the centered and re-scaled arcsine law.
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