Reconstructing the Grassmannian of lines from Kapranov's tilting bundle

Abstract

Let E be the tilting bundle on the Grassmannian Gr(n,r) of r-dimensional quotients of n constructed by Kapranov. Buchweitz, Leuschke and Van den Bergh introduced a quiver Q and a surjective -algebra homomorphism Q→ A=End(E), together with a recipe on how the kernel may be computed. In this paper, for the case r=2 we give a new, direct proof that is surjective and then complete the picture by calculating the ideal of relations explicitly. As an application, we then use this presentation to show that Gr(n,2) is isomorphic to a fine moduli space of certain stable A-modules, just as Pn can be recovered from the endomorphism algebra of Beilinson's tilting bundle 0≤ i≤ nOPn(i).