Up- and Down-Operators on Young's Lattice

Abstract

The up-operators ui and down-operators di (introduced as Schur operators by Fomin) act on partitions by adding/removing a box to/from the ith column if possible. It is well known that the ui alone satisfy the relations of the (local) plactic monoid, and the present authors recently showed that relations of degree at most 4 suffice to describe all relations between the up-operators. Here we characterize the algebra generated by the up- and down-operators together, showing that it can be presented using only quadratic relations.