Algebraic combinatorics approach to moment-to-cumulant relations in free probability

03.12.2021, 11:00  –  2.22 und online
Arbeitsgruppenseminar Analysis

Yannic Vargas (University of Potsdam)

The study of relations between moments and cumulants plays a central role in both classical and non-commutative probability theory. In the last decade, the work of Patras and Ebrahimi-Fard   provided several tools related to  the group of characters on a combinatorial Hopf algebra H of "words on words", and its corresponding Lie algebra of infinitesimal characters. This enables the study of distinct families of cumulants corresponding to different types of independences: free, boolean and monotone. We discuss several formulas for the (known) free-to-moment and boolean-to-moment relations, obtained from the antipode of H. Also, using a weighted Möbius inversion, we deduce a new relation of monotone cumulants in terms of moments.

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