A bijection between the sets of (a,b,b2)-Generalized Motzkin paths avoiding uvv-patterns and uvu-patterns

Abstract

A generalized Motzkin path, called G-Motzkin path for short, of length n is a lattice path from (0, 0) to (n, 0) in the first quadrant of the XOY-plane that consists of up steps u=(1, 1), down steps d=(1, -1), horizontal steps h=(1, 0) and vertical steps v=(0, -1). An (a,b,c)-G-Motzkin path is a weighted G-Motzkin path such that the u-steps, h-steps, v-steps and d-steps are weighted respectively by 1, a, b and c. Let τ be a word on \u, d, v, d\, denoted by Gnτ(a,b,c) the set of τ-avoiding (a,b,c)-G-Motzkin paths of length n for a pattern τ. In this paper, we consider the uvv-avoiding (a,b,c)-G-Motzkin paths and provide a direct bijection σ between Gnuvv(a,b,b2) and Gnuvu(a,b,b2). Finally, the set of fixed points of σ is also described and counted.