Conditionally monotone cumulants via shuffle algebra
Abstract
In this work we study conditional monotone cumulants and additive convolution in the shuffle-algebraic approach to non-commutative probability. We describe c-monotone cumulants as an infinitesimal character and identify the c-monotone additive convolution as an associative operation in the set of pairs of characters in the dual of a double tensor Hopf algebra. In this algebraic framework, we understand previous results on c-monotone cumulants and prove a combinatorial formula that relates c-free and c-monotone cumulants. We also identify the notion of t-Boolean cumulants in the shuffle-algebraic approach and introduce the corresponding notion of t-monotone cumulants as a particular case of c-monotone cumulants.
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