Schr\"oder trees, antipode formulas and non-commutative probability
Abstract
We obtain a cancellation-free formula, represented in terms of Schr\"oder trees, for the antipode in the double tensor Hopf algebra introduced by Ebrahimi-Fard and Patras. We apply the antipode formula in the context of non-commutative probability and recover cumulant-moment formulas as well as a new expression for Anshelevich's free Wick polynomials in terms of Schr\"oder trees.
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