Stingray Patterns of Dominant Weights

Abstract

We study the set Wr,e,w\ of dominant weights of slr arising from partitions of fixed e-weight w. For e-cores, we show that Wr,e,0\ decomposes as a disjoint union of simplices indexed by compositions of r. For general w, we prove that Wr,e,w\ is a disjoint union of copies of these simplices, with multiplicities determined by the corresponding quotient data, yielding in particular a closed counting formula for |Wr,e,w\ |\ . The geometry gives rise to the stingray patterns appearing in the title. More generally, it yields a natural labeling of the dominant e-alcoves meeting Wr,e,w\ by weak compositions of w, together with a compatible partial action of the affine Weyl group via wall crossing. Finally, we give an explicit alcove-geometric proof of the empty runner removal theorem for Iwahori-Hecke algebras.