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A Griffiths' Theorem for varieties with isolated singularities

Vincenzo Di Gennaro, Davide Franco, Giambattista Marini

Published 2010-07-06Version 1

By the fundamental work of Griffiths one knows that, under suitable assumption, homological and algebraic equivalence do not coincide for a general hypersurface section of a smooth projective variety $Y$. In the present paper we prove the same result in case $Y$ has isolated singularities.

Comments: 10 pages

Categories: math.AG

Subjects: 14B05, 14C25, 14D05, 14F43, 14J70, 14K30, 14N05

Keywords: isolated singularities, general hypersurface section, fundamental work, algebraic equivalence, smooth projective variety

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A Griffiths' Theorem for varieties with isolated singularities

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A Griffiths' Theorem for varieties with isolated singularities

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