Combinatorial properties of the numbers of tableaux of bounded height

Abstract

We introduce an infinite family of lower triangular matrices (s), where γn,is counts the standard Young tableaux on n cells and with at most s columns on a suitable subset of shapes. We show that the entries of these matrices satisfy a three-term row recurrence and we deduce recursive and asymptotic properties for the total number τs(n) of tableaux on n cells and with at most s columns.