On the geometry of the anti-canonical bundle of the Bott-Samelson-Demazure-Hansen varieties

Abstract

Let G be a semi-simple simply connected algebraic group over the field C of complex numbers. Let T be a maximal torus of G, and let W be the Weyl group of G with respect to T. Let Z(w,\, i) be the Bott-Samelson-Demazure-Hansen variety corresponding to a tuple i associated to a reduced expression of an element w \,∈\, W. We prove that for the tuple i associated to any reduced expression of a minuscule Weyl group element w, the anti-canonical line bundle on Z(w,\,i) is globally generated. As consequence, we prove that Z(w,\,i) is weak Fano. Assume that G is a simple algebraic group whose type is different from A2. Let S\,=\,\α1,\,·s,\,αn\ be the set of simple roots. Let w be such that support of w is equal to S. We prove that Z(w,\,i) is Fano for the tuple i associated to any reduced expression of w if and only if w is a Coxeter element and w-1(Σt=1nαt)\,∈\, -S.