Enumeration of row-increasing tableaux of two-row skew shapes

Abstract

In this paper, we firstly extend a result of Bonin, Shapiro and Simion by giving the distribution of the major index over generalized Schr\"oder paths. Then by providing a bijection between generalized Schr\"oder paths and row-increasing tableaux of skew shapes with two rows, we obtain the distribution of the major index and the amajor index over these tableaux, which extends a result of Du, Fan and Zhao. We also generalize a result of Pechenik and give the distribution of the major index over increasing tableaux of skew shapes with two rows. Especially, a bijection from row-increasing tableaux with shape (n,m) and maximal value n+m-k to standard Young tableaux with shape ((n-k+1,m-k+1,1k)/(12)) is obtained.