GIG random matrices and a Yang-Baxter extension of the Matsumoto-Yor property

Abstract

Sasada and Uozumi, SasUoz2024, identified independence preserving [2:2] quadrirational parametric Yang-Baxter maps, see YBEQ, on (0,∞). In particular, the map denoted there by HIII,B(α,β), see CS, was connected to the independence preserving property of the GIG distributions on (0,∞). Remarkably, the property appears also naturally in probabilistic integrable models of discrete Korteweg de Vries type, as observed by Croydon and Sasada, CroSas2020. In the case of (α,β)=(1,0) the independence reduces to the classical Matsumoto-Yor property, MatYor2001. In LetWes2024 we proposed an extension of HIII,B(α,β) to a map on the cone of symmetric positive definite matrices of a fixed dimension, showing that such extended map preserves independence of GIG random matrices. In the present paper we prove two results: (i) the matrix GIG distributions are characterized by the independence property governed by this map; (ii) the matrix variate extension of HIII,B(α,β) we use, is a parametric Yang-Baxter map.