An algorithm for Berenstein-Kazhdan decoration functions and trails for minuscule representations

Abstract

For a simply connected connected simple algebraic group G, a cell Bw0-=B- Uw0U is a geometric crystal with a positive structure θi-:(C×)l(w0)→ Bw0-. Applying the tropicalization functor to a rational function hBK=Σi∈ Iw0i,sii called the half decoration on Bw0-, one can realize the crystal B(∞) in Zl(w0). By computing hBK, we get an explicit form of B(∞) in Zl(w0). In this paper, we give an algorithm to compute w0i,sii θi- explicitly for i∈ I such that V(i) is a minuscule representation of g= Lie(G). In particular, the algorithm works for all i∈ I if g is of type An. The algorithm computes a directed graph DG, called a decoration graph, whose vertices are labelled by all monomials in w0i,sii θi-(t1,·s,tl(w0)). The decoration graph has some properties similar to crystal graphs of minuscule representations. We also verify that the algorithm works in some other cases, for example, the case g is of type G2 though V(i) is non-minuscule.