M. V. Catalisano, A. V. Geramita, A. Gimigliano
Published 2006-09-02, updated 2006-09-06Version 2
If $\X \subset \P^n$ is a reduced and irreducible projective variety, it is interesting to find the equations describing the (higher) secant varieties of $\X$. In this paper we find those equations in the following cases: $\X = \P^{n_1}\times...\times\P^{n_t}\times\P^n$ is the Segre embedding of the product and $n$ is "large" with respect to the $n_i$ (Theorem 2.4); $\X$ is a Segre-Veronese embedding of some products with 2 or three factors; $\X$ is a Del Pezzo surface.
Comments: 17 pages, minor changes for section 3 and references
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$\mathfrak S_5$-symmetric equations for the Del Pezzo Surface of Degree 5
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