Geometry of Points Satisfying Cayley-Bacharach Conditions and Applications

Abstract

In this paper, we study the geometry of points in complex projective space that satisfy the Cayley-Bacharach condition with respect to the complete linear system of hypersurfaces of given degree. In particular, we improve a result by Lopez and Pirola and we show that, if k≥ 1 and =\P1,…,Pd\⊂ Pn is a set of distinct points satisfying the Cayley-Bacharach condition with respect to |OPn(k)|, with d≤ h(k-h+3)-1 and 3≤ h≤ 5, then lies on a curve of degree h-1. Then we apply this result to the study of linear series on curves on smooth surfaces in P3. Moreover, we discuss correspondences with null trace on smooth hypersurfaces of Pn and on codimension 2 complete intersections.