We study zero-dimensional fat points schemes on a smooth quadric Q congruent to P^1 x P^1, and we characterize those schemes which are arithmetically Cohen-Macaulay (aCM for short) as sub-schemes of Q giving their Hilbert matrix and bigraded Betti numbers. In particular, we can compute the Hilbert matrix and the bigraded Betti numbers for fat points schemes with homogeneous multiplicities and whose support is a complete intersection (CI for short). Moreover, we find a minimal set of generators for schemes of double points whose support is aCM. (C) 2001 Elsevier Science B.V. All rights reserved.
Fat Points Schemes on a smooth quadric
GUARDO, ELENA MARIA
2001-01-01
Abstract
We study zero-dimensional fat points schemes on a smooth quadric Q congruent to P^1 x P^1, and we characterize those schemes which are arithmetically Cohen-Macaulay (aCM for short) as sub-schemes of Q giving their Hilbert matrix and bigraded Betti numbers. In particular, we can compute the Hilbert matrix and the bigraded Betti numbers for fat points schemes with homogeneous multiplicities and whose support is a complete intersection (CI for short). Moreover, we find a minimal set of generators for schemes of double points whose support is aCM. (C) 2001 Elsevier Science B.V. All rights reserved.File in questo prodotto:
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