On the multiplication of free n-tuples of non-commutative random variables
Abstract
Let a1,...,an, b1,...,bn be random variables in some (non-commutative) probability space, such that \a1, ..., an \ is free from \b1, ..., bn \. We show how the joint distribution of the n-tuple (a1 b1, ..., an bn) can be described in terms of the joint distributions of (a1, ..., an) and (b1, >..., bn), by using the combinatorics of the n-dimensional R-transform. We point out a few applications that can be easily derived from our result, concerning the left-and-right translation with a semicircular element (see Sections 1.6-1.10) and the compression with a projection (see Sections 1.11-1.14) of an n-tuple of non-commutative random variables. A different approach to two of these applications is presented by Dan Voiculescu in an Appendix to the paper.
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