Regularity properties of free multiplicative convolution on the positive line
Abstract
Given two nondegenerate Borel probability measures μ and on R+=[0,∞), we prove that their free multiplicative convolution μ has zero singular continuous part and its absolutely continuous part has a density bounded by x-1. When μ and are compactly supported Jacobi measures on (0,∞) having power law behavior with exponents in (-1,1), we prove that μ is another Jacobi measure whose density has square root decay at the edges of its support.
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