Rigidity of Bott-Samelson-Demazure-Hansen variety for PSO(2n+1, C)

Abstract

Let G=PSO(2n+1, C) (n 3) and B be the Borel subgroup of G containing maximal torus T of G. Let w be an element of Weyl group W and X(w) be the Schubert variety in the flag variety G/B corresponding to w. Let Z(w, i) be the Bott-Samelson-Demazure-Hansen variety (the desingularization of X(w)) corresponding to a reduced expression i of w. In this article, we study the cohomology modules of the tangent bundle on Z(w0, i), where w0 is the longest element of the Weyl group W. We describe all the reduced expressions of w0 in terms of a Coxeter element such that all the higher cohomology modules of the tangent bundle on Z(w0, i) vanish (see Theorem theorem 8.1).