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Hilbert polynomials and powers of ideals
DSpace at IIT Bombay
View Archive Info| Field | Value | |
| Title |
Hilbert polynomials and powers of ideals
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| Creator |
HERZOG, J
PUTHENPURAKAL, TJ VERMA, JK |
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| Subject |
castelnuovo-mumford regularity
symbolic blow-ups asymptotic-behavior bigraded algebras ring |
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| Description |
The growth of Hilbert coefficients for powers of ideals are Studied. For a graded ideal I in the polynomial ring S = K[x(1),.... x(n)] and a finitely generated graded S-module M, the Hilbert coefficients e(i)(M/I(k)M) are polynomial functions. Given two families of graded ideals (I(k))(k >= 0) and (J(k))(k >= 0) with J(k) subset of I(k) for all k with the property that J(k)K(l) subset of J(k+l) and I(k)I(l) subset of I(k+l) for all k and l, and Such that the algebras A = circle plus(k >= 0) J(k) and B = circle plus(k >= 0) I(k) are finitely generated, we show the function k |-> e(0)(I(k)/J(k)) is of quasi-polynomial type, say given by the polynomials P(0),...,P(g-1). If J(k) = J(k) for all k, for a graded ideal J, then we show that all the Pi have the same degree and the same leading coefficient. As one of the applications it is shown that lim(k ->infinity) l(Gamma(m)(S/I(k)))/k(n) is an element of Q, if I is a monomial ideal. We also Study analogous statements in the local case.
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| Publisher |
CAMBRIDGE UNIV PRESS
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| Date |
2011-07-19T10:21:04Z
2011-12-26T12:51:08Z 2011-12-27T05:37:35Z 2011-07-19T10:21:04Z 2011-12-26T12:51:08Z 2011-12-27T05:37:35Z 2008 |
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| Type |
Article
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| Identifier |
MATHEMATICAL PROCEEDINGS OF THE CAMBRIDGE PHILOSOPHICAL SOCIETY, 145(), 623-642
0305-0041 http://dx.doi.org/10.1017/S0305004108001540 http://dspace.library.iitb.ac.in/xmlui/handle/10054/5262 http://hdl.handle.net/10054/5262 |
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| Language |
en
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