Hoffmann-Jrgensen Inequalities for Random Walks on the Cone of Positive Definite Matrices

Abstract

We consider random walks on the cone of m × m positive definite matrices, where the underlying random matrices have orthogonally invariant distributions on the cone and the Riemannian metric is the measure of distance on the cone. By applying results of Khare and Rajaratnam (Ann. Probab., 45 (2017), 4101--4111), we obtain inequalities of Hoffmann-Jrgensen type for such random walks on the cone. In the case of the Wishart distribution Wm(a,Im), with index parameter a and matrix parameter Im, the identity matrix, we derive explicit and computable bounds for each term appearing in the Hoffmann-Jrgensen inequalities.