Article ID Journal Published Year Pages File Type
4655782 Journal of Combinatorial Theory, Series A 2011 21 Pages PDF
Abstract

Given a list of n cells L=[(p1,q1),…,(pn,qn)] where pi,qi∈Z⩾0, we let . The space of diagonally alternating polynomials is spanned by {ΔL} where L varies among all lists with n cells. For a>0, the operators act on diagonally alternating polynomials. Haiman has shown that the space An of diagonally alternating harmonic polynomials is spanned by {EλΔn} where λ=(λ1,…,λℓ) varies among all partitions, Eλ=Eλ1⋯Eλℓ and . For with tm>⋯>t1>0, we consider here the operator Ft=det‖Etm−j+1+(j−i)‖. Our first result is to show that FtΔL is a linear combination of ΔL′ where L′ is obtained by moving ℓ(t)=m distinct cells of L in some determined fashion. This allows us to control the leading term of some elements of the form Ft(1)⋯Ft(r)Δn. We use this to describe explicit bases of some of the bihomogeneous components of where . More precisely, we give an explicit basis of whenever k

Related Topics
Physical Sciences and Engineering Mathematics Discrete Mathematics and Combinatorics