Anticanonical geometry of the blow-up of P4 in 8 points and its Fano model

Abstract

Building on the work of Casagrande-Codogni-Fanelli, we develop our study on the birational geometry of the Fano fourfold Y=MS,-KS which is the moduli space of semi-stable rank-two torsion-free sheaves with c1=-KS and c2=2 on a polarised degree-one del Pezzo surface (S,-KS). Based on the relation between Y and the blow-up of P4 in 8 points, we describe completely the base scheme of the anticanonical system |-KY|. We also prove that the Bertini involution Y of Y, induced by the Bertini involution S of S, preserves every member in |-KY|. In particular, we establish the relation between Y and the anticanonical map of Y, and we describe the action of Y by analogy with the action of S on S.