Jucys-Murphy elements of partition algebras for the rook monoid

Abstract

Kudryavtseva and Mazorchuk exhibited Schur-Weyl duality between the rook monoid algebra CRn and the subalgebra CIk of the partition algebra C Ak(n) acting on (Cn) k. In this paper, we consider a subalgebra CIk+12 of C Ik+1 such that there is Schur-Weyl duality between the actions of C Rn-1 and C Ik+12 on (Cn) k. This paper studies the representation theory of partition algebras CIk and CIk+12 for rook monoids inductively by considering the multiplicity free tower C I1⊂ C I32⊂ C I2⊂ ·s⊂ C Ik⊂ C Ik+12⊂·s. Furthermore, this inductive approach is established as a spectral approach by describing the Jucys-Murphy elements and their actions on the canonical Gelfand-Tsetlin bases, determined by the aforementioned multiplicity free tower, of irreducible representations of C Ik and C Ik+12. Also, we describe the Jucys-Murphy elements of C Rn which play a central role in the demonstration of the actions of Jucys-Murphy elements of C Ik and CIk+12.