Modules and Structures of Planar Upper Triangular Rook Monoids

Abstract

In this paper, we discuss modules and structures of the planar upper triangular rook monoid Bn. We first show that the order of Bn is a Catalan number, then we investigate the properties of a module V over Bn generated by a set of elements vS indexed by the power set of 1, ..., n. We find that every nonzero submodule of V is cyclic and completely decomposable; we give a necessary and sufficient condition for a submodule of V to be indecomposable. We show that every irreducible submodule of V is 1-dimensional. Furthermore, we give a formula for calculating the dimension of every submodule of V. In particular, we provide a recursive formula for calculating the dimension of the cyclic module generated by vS, and show that some dimensions are Catalan numbers, giving rise to new combinatorial identities.