SOME PROPERTIES OF THE MULTIPLICITY SEQUENCE FOR ARBITRARY IDEALS
| Contribuinte(s) |
UNIVERSIDADE DE SÃO PAULO |
|---|---|
| Data(s) |
18/04/2012
18/04/2012
2010
|
| Resumo |
In this work we prove that the Achilles-Manaresi multiplicity sequence, like the classical Hilbert-Samuel multiplicity, is additive with respect to the exact sequence of modules. We also prove the associativity formula for his mulitplicity sequence. As a consequence, we give new proofs for two results already known. First, the Achilles-Manaresi multiplicity sequence is an invariant up to reduction, a result first proved by Ciuperca. Second, I subset of J is a reduction of (J,M) if and only if c(0)(I(p), M(p)) = c(0)(J(p), M(p)) for all p is an element of Spec(A), a result first proved by Flenner and Manaresi. PADCT/CT-INFRA/CNPq/MCT[620120/04-5] CNPq[151733/2006-6] CNPq[308915/2006-2] CAPES[3131/04-1] |
| Identificador |
ROCKY MOUNTAIN JOURNAL OF MATHEMATICS, v.40, n.6, p.1809-1827, 2010 0035-7596 http://producao.usp.br/handle/BDPI/15925 10.1216/RMJ-2010-40-6-1809 |
| Idioma(s) |
eng |
| Publicador |
ROCKY MT MATH CONSORTIUM |
| Relação |
Rocky Mountain Journal of Mathematics |
| Direitos |
openAccess Copyright ROCKY MT MATH CONSORTIUM |
| Palavras-Chave | #Ree's theorem #integral closure #multiplicity sequence #NUMERICAL CHARACTERIZATION #SEGRE NUMBERS #Mathematics |
| Tipo |
article original article publishedVersion |
