Blow-ups of Pn-3 at n points and spinor varieties

Abstract

Work of Dolgachev and Castravet-Tevelev establishes a bijection between the 2n-1 weights of the half-spin representations of so2n and the generators of the Cox ring of the variety Xn which is obtained by blowing up Pn-3 at n points. We derive a geometric explanation for this bijection, by embedding Cox(Xn) into the even spinor variety (the homogeneous space of the even half-spin representation). The Cox ring of the blow-up Xn is recovered geometrically by intersecting torus translates of the even spinor variety. These are higher-dimensional generalizations of results by Derenthal and Serganova-Skorobogatov on del Pezzo surfaces.