Sur les vari\'et\'es X dans PN telles que par n points passe une courbe de X de degr\'e donn\'e

Abstract

Given integers r>1, n>1 and q> n-2, we consider projective varieties X of dimension r+1 such that through n generic points of X passes a rational curve of degree q, contained in X. More precisely, we study the class Xr+1,n(q) of such varieties which moreover generate a projective space of the maximal dimension. We determine all varieties of a class Xr+1,n(q) when q is not equal to 2n-3. In particuliar, we show that there exists a variety X' in Pr+n-1, of minimal degree and a birational map F: X'---> X which sends a generic section of X' by a Pn-1 onto a rational normal curve of degree q. Without hypothesis on q, we define a quasi-grassmannian structure on the space of the rational normal curves of degree q contained in a variety X of the class Xr+1,n(q). We prove that X is of the form described above if and only if this quasi-grassmannian structure is flat. We also give examples of varieties of the classes Xr+1,3(3) et Xr+1,4(5) which are not of this form.