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Título:
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On the depth of the tangent cone and the growth of the Hilbert function
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Autor/a:
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Elías García, Joan
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Otros autores:
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Universitat de Barcelona |
Abstract:
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For a d-dimensional Cohen-Macaulay local ring (R,m) we study the depth of the associated graded ring of R with respect to an m-primary ideal I in terms of the Vallabrega-Valla conditions and the length of It+1/JIt, where J is a J minimal reduction of I and t≥ 1. As a corollary we generalize Sally's conjecture on the depth of the associated graded ring with respect to a maximal ideal to m-primary ideals. We also study the growth of the Hilbert function. |
Materia(s):
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-Anells locals -Ideals (Àlgebra) -Homologia -Funcions característiques -Geometria algebraica -Associated graded rings of ideals -Homological methods -Hilbert-Samuel and Hilbert-Kunz functions -Poincaré series -Local rings and semilocal rings |
Derechos:
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(c) American Mathematical Society, 1999
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Tipo de documento:
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Artículo Artículo - Versión publicada |
Editor:
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American Mathematical Society
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