A combinatorial bijection on k-noncrossing partitions

Abstract

For any integer k≥2, we prove combinatorially the following Euler (binomial) transformation identity n+1(k)(t)=tΣi=0nn ii(k)(t), where m(k)(t) (resp.~m(k)(t)) is the sum of weights, tnumber of blocks, of partitions of \1,…,m\ without k-crossings (resp.~enhanced k-crossings). The special k=2 and t=1 case, asserting the Euler transformation of Motzkin numbers are Catalan numbers, was discovered by Donaghey 1977. The result for k=3 and t=1, arising naturally in a recent study of pattern avoidance in ascent sequences and inversion sequences, was proved only analytically.