Alcove walks, buildings, symmetric functions and representations

Abstract

For a complex simple Lie algebra, the dimension Kλμ of the μ weight space of a finite dimensional representation of highest weight λ is the same as the number of Littelmann paths of type λ and weight μ. In this paper we give an explicit construction of a path of type λ and weight μ whenever Kλμ 0. This construction has additional consequences, it produces an explicit point in the building which chamber retracts to λ and sector retracts to μ, and an explicit point of the affine Grassmannian in the corresponding Mirkovi\'c-Vilonen intersection. In an appendix we discuss the connection between retractions in buildings and alcove walks.