English

$S$-transform in Finite Free Probability

Operator Algebras 2025-02-06 v2 Probability

Abstract

We present a simplified explanation of why free fractional convolution corresponds to the differentiation of polynomials, by finding how the finite free cumulants of a polynomial behave under differentiation. This approach allows us to understand the limiting behaviour of the coefficients e~k(pd)\widetilde{\mathsf{e}}_k(p_d) of pdp_d when the degree dd tends to infinity and the empirical root distribution of pdp_d has a limiting distribution μ\mu on [0,)[0,\infty). Specifically, we relate the asymptotic behaviour of the ratio of consecutive coefficients to Voiculescu's SS-transform of μ\mu. This prompts us to define a new notion of finite SS-transform, which converges to Voiculescu's SS-transform in the large dd limit. It also satisfies several analogous properties to those of the SS-transform in free probability, including multiplicativity and monotonicity. This new insight has several applications that strengthen the connection between free and finite free probability. Most notably, we generalize the approximation of d\boxtimes_d to \boxtimes and prove a finite approximation of the Tucci--Haagerup--M\"oller limit theorem in free probability, conjectured by two of the authors. We also provide finite analogues of the free multiplicative Poisson law, the free max-convolution powers and some free stable laws.

Keywords

Cite

@article{arxiv.2408.09337,
  title  = {$S$-transform in Finite Free Probability},
  author = {Octavio Arizmendi and Katsunori Fujie and Daniel Perales and Yuki Ueda},
  journal= {arXiv preprint arXiv:2408.09337},
  year   = {2025}
}

Comments

45 pages

R2 v1 2026-06-28T18:15:43.993Z