A Characterization of the Riesz Probability Distribution

“…We consider quotient U for an arbitrary, fixed division algorithm g as in the original paper of Olkin and Rubin [21], additionally satisfying some natural conditions. In the known cases (g = g 1 and g = g 2 ), this improves the results obtained in Bobecka and Wesołowski, Hassairi et al and Kołodziejek [2,11,13]. In general case, the densities of X and Y are given in terms of, so-called, w-multiplicative Cauchy functions, that is functions satisfying…”

“…Exploiting the same approach, with the same technical assumptions on densities as in Bobecka and Wesołowski [2], it was proven by Hassairi et al [11] that the independence of X + Y and the quotient defined through the Cholesky decomposition, i.e., g 2 (a) = T −1 a , where T a is a lower triangular matrix such that a = T a · T T a ∈ + , characterizes a wider family of distributions called Riesz (or sometimes called RieszWishart). This fact shows that the invariance property assumed in Olkin and Rubin [21] and Casalis and Letac [7] is not of technical nature only.…”

“…Section 3 is devoted to consideration of w-logarithmic Cauchy functions and the Olkin-Baker functional equation. In that section, we offer much shorter, simpler and covering more general cones proof of the Olkin-Baker functional equation than given in Bobecka and Wesołowski, Hassairi et al and Kołodziejek [2,11,13].…”

The Lukacs–Olkin–Rubin Theorem on Symmetric Cones Without Invariance of the “Quotient”

“…We consider quotient U for an arbitrary, fixed division algorithm g as in the original paper of Olkin and Rubin [21], additionally satisfying some natural conditions. In the known cases (g = g 1 and g = g 2 ), this improves the results obtained in Bobecka and Wesołowski, Hassairi et al and Kołodziejek [2,11,13]. In general case, the densities of X and Y are given in terms of, so-called, w-multiplicative Cauchy functions, that is functions satisfying…”

“…Exploiting the same approach, with the same technical assumptions on densities as in Bobecka and Wesołowski [2], it was proven by Hassairi et al [11] that the independence of X + Y and the quotient defined through the Cholesky decomposition, i.e., g 2 (a) = T −1 a , where T a is a lower triangular matrix such that a = T a · T T a ∈ + , characterizes a wider family of distributions called Riesz (or sometimes called RieszWishart). This fact shows that the invariance property assumed in Olkin and Rubin [21] and Casalis and Letac [7] is not of technical nature only.…”

“…Section 3 is devoted to consideration of w-logarithmic Cauchy functions and the Olkin-Baker functional equation. In that section, we offer much shorter, simpler and covering more general cones proof of the Olkin-Baker functional equation than given in Bobecka and Wesołowski, Hassairi et al and Kołodziejek [2,11,13].…”

The Lukacs–Olkin–Rubin Theorem on Symmetric Cones Without Invariance of the “Quotient”

“…Our interest in this functional equation stems from investigations of characterization problems for probabilistic measures concentrated on Ω + or more generally on symmetric cones-see [1,3,4,10,12,13].…”

“…It was indirectly solved for differentiable functions in [10]. Here we solve this functional equation under no regularity assumptions and, at the same time, we find all real characters of the triangular group.…”

Multiplicative Cauchy functional equation on symmetric cones

The Extended Matrix-Variate Beta Probability Distribution on Symmetric Matrices