English

Free Brownian motion and free convolution semigroups: multiplicative case

Functional Analysis 2013-11-26 v3 Probability

Abstract

We consider a pair of probability measures μ,ν\mu,\nu on the unit circle such that Σλ(ην(z))=z/ημ(z)\Sigma_{\lambda}(\eta_{\nu}(z))=z/\eta_{\mu}(z). We prove that the same type of equation holds for any t0t\geq 0 when we replace ν\nu by νλt\nu\boxtimes\lambda_t and μ\mu by Mt(μ)\mathbb{M}_t(\mu), where λt\lambda_t is the free multiplicative analogue of the normal distribution on the unit circle of C\mathbb{C} and Mt\mathbb{M}_t is the map defined by Arizmendi and Hasebe. These equations are a multiplicative analogue of equations studied by Belinschi and Nica. In order to achieve this result, we study infinite divisibility of the measures associated with subordination functions in multiplicative free Brownian motion and multiplicative free convolution semigroups. We use the modified S\mathcal{S}-transform introduced by Raj Rao and Speicher to deal with the case that ν\nu has mean zero. The same type of the result holds for convolutions on the positive real line. We also obtain some regularity properties for the free multiplicative analogue of the normal distributions.

Keywords

Cite

@article{arxiv.1210.6090,
  title  = {Free Brownian motion and free convolution semigroups: multiplicative case},
  author = {Ping Zhong},
  journal= {arXiv preprint arXiv:1210.6090},
  year   = {2013}
}

Comments

to appear in Pacific Journal of Mathematics

R2 v1 2026-06-21T22:26:09.773Z