Schröder trees and antipode formulas: An application to non-commutative probability and Wick polynomials

Adrián Celestino; Yannic Vargas

doi:10.4171/aihpd/216

JournalsaihpdVol. 13, No. 3pp. 411–465

Schröder trees and antipode formulas: An application to non-commutative probability and Wick polynomials

Adrián Celestino
Graz University of Technology, Austria
Yannic Vargas
CUNEF Universidad, Madrid, Spain

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Abstract

The double tensor Hopf algebra has been introduced by Ebrahimi-Fard and Patras to provide an algebraic framework for cumulants in non-commutative probability theory. In this paper, we obtain a cancellation-free formula, represented in terms of Schröder trees, for the antipode in the double tensor Hopf algebra. We apply the antipode formula to recover cumulant-moment formulas as well as a new expression for Anshelevich’s free Wick polynomials in terms of Schröder trees.

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Adrián Celestino, Yannic Vargas, Schröder trees and antipode formulas: An application to non-commutative probability and Wick polynomials. Ann. Inst. Henri Poincaré Comb. Phys. Interact. 13 (2026), no. 3, pp. 411–465

DOI 10.4171/AIHPD/216