Riemannian Gaussian distributions, random matrix ensembles and diffusion
kernels
- URL: http://arxiv.org/abs/2011.13680v2
- Date: Tue, 26 Oct 2021 21:50:27 GMT
- Title: Riemannian Gaussian distributions, random matrix ensembles and diffusion
kernels
- Authors: Leonardo Santilli and Miguel Tierz
- Abstract summary: We show how to compute marginals of the probability density functions on a random matrix type of symmetric spaces.
We also show how the probability density functions are a particular case of diffusion kernels of the Karlin-McGregor type, describing non-intersecting processes in the Weyl chamber of Lie groups.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We show that the Riemannian Gaussian distributions on symmetric spaces,
introduced in recent years, are of standard random matrix type. We exploit this
to compute analytically marginals of the probability density functions. This
can be done fully, using Stieltjes-Wigert orthogonal polynomials, for the case
of the space of Hermitian matrices, where the distributions have already
appeared in the physics literature. For the case when the symmetric space is
the space of $m \times m$ symmetric positive definite matrices, we show how to
efficiently compute by evaluating Pfaffians at specific values of $m$.
Equivalently, we can obtain the same result by constructing specific skew
orthogonal polynomials with regards to the log-normal weight function (skew
Stieltjes-Wigert polynomials). Other symmetric spaces are studied and the same
type of result is obtained for the quaternionic case. Moreover, we show how the
probability density functions are a particular case of diffusion reproducing
kernels of the Karlin-McGregor type, describing non-intersecting Brownian
motions, which are also diffusion processes in the Weyl chamber of Lie groups.
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