Matsumoto-Yor and Dufresne type theorems for a random walk on positive definite matrices
Abstract
We establish analogues of the geometric Pitman 2M-X theorem of Matsumoto and Yor and of the classical Dufresne identity, for a multiplicative random walk on positive definite matrices with Beta type II distributed increments. The Dufresne type identity provides another example of a stochastic matrix recursion, as considered by Chamayou and Letac (J. Theoret. Probab. 12, 1999), that admits an explicit solution.
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