On the prime ideals of higher secant varieties of Veronese embeddings of small degrees
Abstract
In this paper, we study minimal generators of the (saturated) defining ideal of σk(vd(Pn)) in PN with N=n+dd-1, the k-secant variety of d-uple Veronese embedding of projective n-space, of a relatively small degree. We first show that the prime ideal I(σ4(v3(P3))) can be minimally generated by 36 homogeneous polynomials of degree 5. It implies that σ4(v3(P3)) ⊂ P19 is a del Pezzo 4-secant variety (i.e., deg(σ4(v3(P3))) = 105 and the sectional genus π(σ4(v3(P3))) = 316) and provides a new example of an arithmetically Gorenstein variety of codimension 4. As an application, we decide non-singularity of a certain locus in σ4(v3(P3)). By inheritance, generators of I(σ4(v3(Pn))) are also obtained for any n ≥ 3. We also propose a procedure to compute the first non-trivial degree piece I(σk(vd(Pn)))k+1 for a general k-th secant case, in terms of prolongation and weight space decomposition, based on the method used for σ4(v3(P3)) and treat a few more cases of k-secant varieties of the Veronese embedding of a relatively small degree in the end.
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