Enumeration of partial Lukasiewicz paths

Abstract

ukasiewicz paths are lattice paths in N2 starting at the origin, ending on the x-axis, and consisting of steps in the set \(1,k), k≥ -1\. We give generating function and exact value for the number of n-length prefixes (resp. suffixes) of these paths ending at height k≥ 0 with a given type of step. We make a similar study for prefixes of height at most t≥ 0. Using the explicit forms for the paths of bounded height, we evaluate the average height asymptotically. For fixed k and n∞, this quantity behaves as π n. Finally we study (in the same way) prefixes of alternate ukasiewicz paths, i.e., ukasiewicz paths that do contain two consecutive steps with the same direction.

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