Abstract

Let X be a minuscule Schubert variety. In this paper, we associate a quiver with X and use the combinatorics of this quiver to describe all relative minimal models : X X. We prove that all the morphisms are small and give a combinatorial criterion for X to be smooth and thus a small resolution of X. We describe in this way all small resolutions of X. As another application of this description of relative minimal models, we obtain the following more intrinsic statement of the main result of Perrin, J. Algebra 294 (2005), 431-462. Let A 1 (X) be an effective 1-cycle class. Then the irreducible components of the scheme Hom (p 1 , X) of morphisms from P 1 to X and of class are indexed by the set: ne() = { A 1 ( X) | is effective and * = } which is independent of the choice of a relative minimal model X of X.