Dyck paths on black-and-white lattices
Abstract
A Dyck path of semilength n is a lattice path from (0,0) to (n,n) consisting of n right-steps (1,0) and n up-steps (0,1) that never rises above the line y=x. These paths are enumerated by the Catalan numbers and play a central role in enumerative combinatorics. We color the cells of the integer grid in black and white according to two natural patterns, namely chessboard and column-alternating, and enumerate the Dyck paths having equal numbers of black and white cells beneath them.
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