English

Generalized Wright Analysis in Infinite Dimensions

Probability 2025-07-28 v2 Functional Analysis

Abstract

This paper investigates a broad class of non-Gaussian measures, μΨ \mu_\Psi, associated with a family of generalized Wright functions, mΨq_m\Psi_q. First, we study these measures in Euclidean spaces Rd\mathbb{R}^d, then define them in an abstract nuclear triple NHN\mathcal{N}\subset\mathcal{H}\subset\mathcal{N}'. We study analyticity, invariance properties, and ergodicity under a particular group of automorphisms. Then we show the existence of an Appell system which allows the extension of the non-Gaussian Hilbert space L2(μΨ)L^2(\mu_\Psi) to the nuclear triple consisting of test functions' and distributions' spaces, (N)1L2(μΨ)(N)μΨ1(\mathcal{N})^{1}\subset L^2(\mu_\Psi)\subset(\mathcal{N})_{\mu_\Psi}^{-1}. Furthermore, thanks to the definition of two transformations, SμΨS_{\mu_{\Psi}} and TμΨT_{\mu_{\Psi}}, we study Donsker's delta as an element within (N)μΨ1(\mathcal{N})_{\mu_\Psi}^{-1} applying the integral equations fulfilled by mΨq_m\Psi_q.

Keywords

Cite

@article{arxiv.2405.01665,
  title  = {Generalized Wright Analysis in Infinite Dimensions},
  author = {Luisa Beghin and Lorenzo Cristofaro and José L. da Silva},
  journal= {arXiv preprint arXiv:2405.01665},
  year   = {2025}
}
R2 v1 2026-06-28T16:14:47.174Z