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Generalized Dyck paths of bounded height

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abstract

Generalized Dyck paths (or discrete excursions) are one-dimensional paths that take their steps in a given finite set S, start and end at height 0, and remain at a non-negative height. Bousquet-M\'elou showed that the generating function E_k of excursions of height at most k is of the form F_k/F_{k+1}, where the F_k are polynomials satisfying a linear recurrence relation. We give a combinatorial interpretation of the polynomials F_k and of their recurrence relation using a transfer matrix method. We then extend our method to enumerate discrete meanders (or paths that start at 0 and remain at a non-negative height, but may end anywhere). Finally, we study the particular case where the set S is symmetric and show that several simplifications occur.

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math.CO 1

years

2026 1

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UNVERDICTED 1

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Area and water-capacity statistics for upper hulls of Dyck paths

math.CO · 2026-06-07 · unverdicted · novelty 6.0

Derives exact four-variable height expansion for Dyck paths with area and water-capacity weights and proves the length radius of G(x,1,p,q) equals the minimum positive real denominator branch, plus a (1-s)^{2/3} accumulation law on the diagonal.

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  • Area and water-capacity statistics for upper hulls of Dyck paths math.CO · 2026-06-07 · unverdicted · none · ref 3 · internal anchor

    Derives exact four-variable height expansion for Dyck paths with area and water-capacity weights and proves the length radius of G(x,1,p,q) equals the minimum positive real denominator branch, plus a (1-s)^{2/3} accumulation law on the diagonal.