The Verma bases construction for the Littelmann modules (Q2719486)

The main result of the paper is as follows. Let \(L(\lambda)\) be the Littelmann module corresponding to the highest weight \(\lambda\) [see \textit{P.~Littelmann}, Ann. Math. (2) 142, 499-525 (1995; Zbl 0858.17023)]. In the space \(L(\lambda)\) the weight basis \( B(\lambda) = S(\lambda)1_\lambda \) is constructed, where \(1_\lambda\) is the dominant vector of the module \(L(\lambda)\) and \(S(\lambda)\) is a special set of monomials of the root operators in the Littelmann sense (loc. cit.) with the weights \(-\alpha_i\), where \(\alpha_i\) \((i=1,\dots,n) \) is the system of simple roots of the algebra \(\mathfrak g\). The structure \(S(\lambda)\) is connected with some special choice of the reduced decomposition of the element of maximal length in the Weyl group \(W = W(\mathfrak g)\).