Abstract

In this paper, we generalize the notions of a matrix and its ideal of 2×2 minors to that of a box-shaped matrix and its ideal of 2×2 minors, and make use of these notions to study projective embeddings of certain blowup surfaces. We prove that the ideal of 2×2 minors of a generic box-shaped matrix is a perfect prime ideal that gives the algebraic description for the Segre embedding of the product of several projective spaces. We use the notion of the ideal of 2×2 minors of a box-shaped matrix to give an explicit description for the defining ideal of the blowup of P 2 along a set of ( d+1 2 ) (d∈ Z) points in generic position, embedded into projective spaces using very ample divisors which correspond to the linear systems of plane curves going through these points.

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