Combinatorial interpretation of the Schlesinger-Zudilin stuffle product

Published 25 Sep 2024 in math.CO and math.NT | (2409.16966v1)

Abstract: We show how the quasi--shuffle product, Schlesinger--Zudilin $q$--multiple zeta values satisfy, behaves on the level of partitions. For this, we work with marked partitions, which are partitions in whose Young--tableau rows and columns are marked in some way.

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Benjamin Brindle

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