Grossberg-Karshon twisted cubes and hesitant walk avoidance

Abstract

Let G be a complex semisimple simply connected linear algebraic group. Let λ be a dominant weight for G and I = (i1, i2, …, in) a word decomposition for an element w = si1 si2 ·s sin of the Weyl group of G, where the si are the simple reflections. In the 1990s, Grossberg and Karshon introduced a virtual lattice polytope associated to λ and I, which they called a twisted cube, whose lattice points encode (counted with sign according to a density function) characters of representations of G. In recent work, the first author and Jihyeon Yang prove that the Grossberg-Karshon twisted cube is untwisted (so the support of the density function is a closed convex polytope) precisely when a certain torus-invariant divisor on a toric variety, constructed from the data of λ and I, is basepoint-free. This corresponds to the situation in which the Grossberg-Karshon character formula is a true combinatorial formula in the sense that there are no terms appearing with a minus sign. In this note, we translate this toric-geometric condition to the combinatorics of I and λ. More precisely, we introduce the notion of hesitant λ-walks and then prove that the associated Grossberg-Karshon twisted cube is untwisted precisely when I is hesitant-λ-walk-avoiding.