Tensor product surfaces and quadratic syzygies

Abstract

For U⊂eq H0(OP1× P1(a,b)) a four-dimensional vector space, a basis \p0,p1,p2,p3\ of U defines a rational map φU:\,P1× P1 P3. The tensor product surface associated to U is the closed image XU of the map φU. These surfaces arise within the field of geometric modelling, in which case it is particularly desirable to obtain the implicit equation of XU. In this paper, we study XU via the syzygies of the associated bigraded ideal IU=(p0,p1,p2,p3) when U is free of basepoints, i.e. φU is regular. Expanding upon work of Duarte and Schenck for such ideals with a linear syzygy, we address the case that IU has a quadratic syzygy.