In this paper we establish new upper bounds on the degree of a two-codimensional non-degenerate integral variety in projective space, depending on the dimension of the variety and on a non-lifting level s for it, i.e. a level such that there is an element of degree s in the defining ideal of a general hyperplane section of the variety which is not restriction of any element of the same degree in the defining ideal of the variety.

Bounds on the degree of two-codimensional integral varieties in projective space

VALENZANO, Mario
2001-01-01

Abstract

In this paper we establish new upper bounds on the degree of a two-codimensional non-degenerate integral variety in projective space, depending on the dimension of the variety and on a non-lifting level s for it, i.e. a level such that there is an element of degree s in the defining ideal of a general hyperplane section of the variety which is not restriction of any element of the same degree in the defining ideal of the variety.
2001
158
111
122
lifting problem; varieties of small codimension
M. Valenzano
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/10472
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