On some high-dimensional limits of matricial stochastic processes seen from a quantum probability perspective
Abstract
We generalize the result of block-wise convergence of the Brownian motion on the unitary group U(nm) towards a quantum L\'evy process on the unitary dual group U n when m→∞, obtained by the author in a previous paper, by showing that the Brownian motions on the orthogonal group O(nm) and the symplectic group Sp(nm) also converge block-wise to this same quantum L\'evy process.
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