Moduli map of second fundamental forms on a nonsingular intersection of two quadrics

Abstract

In [GH], Griffiths and Harris asked whether a projective complex submanifold of codimension two is determined by the moduli of its second fundamental forms. More precisely, given a nonsingular subvariety Xn ⊂ Pn+2, the second fundamental form IIX,x at a point x ∈ X is a pencil of quadrics on Tx(X), defining a rational map μX from X to a suitable moduli space of pencils of quadrics on a complex vector space of dimension n. The question raised by Griffiths and Harris was whether the image of μX determines X. We study this question when Xn ⊂ Pn+2 is a nonsingular intersection of two quadric hypersurfaces of dimension n >4. In this case, the second fundamental form IIX,x at a general point x ∈ X is a nonsingular pencil of quadrics. Firstly, we prove that the moduli map μX is dominant over the moduli of nonsingular pencils of quadrics. This gives a negative answer to Griffiths-Harris's question. To remedy the situation, we consider a refined version μX of the moduli map μX, which takes into account the infinitesimal information of μX. Our main result is an affirmative answer in terms of the refined moduli map: we prove that the image of μX determines X, among nonsingular intersections of two quadrics.