Partition algebras as monoid algebras

Abstract

Wilcox has considered a twisted semigroup algebra structure on the partition algebra CAk(n), but it appears that there has not previously been any known basis that gives CAk(n) the structure of a "non-twisted" semigroup algebra or a monoid algebra. This motivates the following problem, for the non-degenerate case whereby n ∈ C \ 0, 1, …, 2 k - 2 \ so that CAk(n) is semisimple. How could a basis Mk = M of CAk(n) be constructed so that M is closed under the multiplicative operation on CAk(n), in such a way so that M is a monoid under this operation, and how could a product rule for elements in M be defined in an explicit and combinatorial way in terms of partition diagrams? We construct a basis M of the desired form using Halverson and Ram's matrix unit construction for partition algebras, Benkart and Halverson's bijection between vacillating tableaux and set-partition tableaux, an analogue given by Colmenarejo et al. for partition diagrams of the RSK correspondence, and a variant of a result due to Hewitt and Zuckerman characterizing finite-dimensional semisimple algebras that are isomorphic to semigroup algebras.