On the Hilbert function of intersections of a hypersurface with general reducible curves

Abstract

Let W⊂ Pn, n 3, be a degree k hypersurface. Consider a "general" reducible, but connected, curve Y⊂ Pn, for instance a sufficiently general connected and nodal union of lines with pa(Y)=0, i.e. a tree of lines. We study the Hilbert function of the set Y W with cardinality k (Y) and prove when it is the expected one. We give complete classification of the exceptions for k=2 and for n=k=3. We apply these results and tools to the case in which Y is a smooth curve with OY(1) non-special.