The Planar Rook Algebra and Pascal's Triangle

Abstract

We study the combinatorial representation theory of the ``planar rook algebra" Pn. This algebra has a basis consisting of planar rook diagrams and multiplication given by diagram concatenation. For each integer 0 k n, we construct natural representations Vnk which form a complete set of non-isomorphic, irreducible Pn-representations. We explicitly decompose the regular representation of Pn into a direct sum of irreducible modules. We compute the Bratteli diagram for the tower of algebras P0 ⊂eq P1 ⊂eq P2 ⊂eq ... and show that this Bratteli diagram is Pascal's triangle. In fact, we show that many of the binomial identities, both additive and multiplicative, have interpretations in terms of the representation theory of the planar rook algebra.