An interpolation problem for the normal bundle of curves of genus g 2 and high degree in Pr

Abstract

Let C⊂ Pn be a smooth curve and NC its normal bundle. NC satisfies strong interpolation if for all integers s>0 and λ i∈ \0,1,… ,n-1\, 1 i s, there are distinct points P1,… ,Ps∈ C and linear subspaces Ui⊂eq E|Pi such that (Ui)= λ i for all i and the evaluation map H0(E) i=1s Ui has maximal rank (A. Atanasios). We prove that C satisfies strong interpolation if either C is a linearly normal elliptic curve or C is a general embedding of degree d (5n-8)g+2n2-5n+4 of a smooth curve X of genus g 2.