Richard Ehrenborg, Gábor Hetyei, Margaret Readdy
Published 2023-10-10Version 1
We study two classes of permutations intimately related to the visual proof of Spitzer's lemma and Huq's generalization of the Chung-Feller theorem. Both classes of permutations are counted by the Fuss-Catalan numbers. The study of one class leads to a generalization of results of Flajolet from continued fractions to continuants. The study of the other class leads to the discovery of a restricted variant of the Foata--Strehl group action.
A determinant representation for generalized ballot and Fuss-Catalan numbers
Pattern-avoidance and Fuss-Catalan numbers
Fuss-Catalan numbers and planar partitions
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