Seshadri constants on P1×P1, and applications to the symplectic packing problem

Abstract

In this paper we compute the r-point Seshadri constant on P1×P1 for those line bundles where the answer might be expected to be governed by (-1)-curves. As a consequence we obtain explicit formulas for the symplectic packing problem for P1×P1. Some exact values of the Seshadri constant outside the region governed by Mori's cone theorem are also given. These latter results use a useful new "reflection method". In the analysis there is a striking difference between the cases when r is odd and when r is even. When r is even the problem admits an infinite order automorphism, and there are infinitely many (-1)-curves to consider. In contrast, when r is odd only a finite number (usually 4) types of (-1)-curves are relevant to our answer.