Components of the Hilbert Scheme of smooth projective curves using ruled surfaces II: existence of non-reduced components

Abstract

For γ ≥ 7 and g ≥ 6γ + 5, we construct a family F of curves lying on cones in Pg-3γ+1 over smooth non-degenerate curves of genus γ and degree g-2γ in Pg-3γ+1. We show that F = 2g-γ-1 + (g-3γ+1)2. For a general curve X from the family F, we compute the dimension of the space of its first-order deformations. We prove that the family F gives rise to an irreducible, non-reduced component D of the Hilbert scheme I2g-4γ + 1, g, g - 3γ + 1, which parametrizes smooth, irreducible, non-degenerate curves of degree 2g-4γ + 1 and genus g in Pg-3γ+1. We obtain T[X] D = D + 1 = F + 1.