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The notion of (FC)-sequences was built in Viet [Viet, D. Q. (2000). Mixed multiplicities of arbitrary ideals in local rings. Comm. Algebra 28(8):3803-3821] containing important information for multiplicities and reductions of ideals [see Viet, D. Q. 2000; Viet, D. Q. (2003a). On some properties of (FC)-sequences of ideals in local rings. Proc. Am. Math. Soc. 131:45-53; Viet, D. Q. (2003b). Sequences determining mixed multiplicities and reductions of ideals. Comm. Algebra 31(10):5047-5069; Viet, D. Q. (2003c). On the mixed multiplicity and the multiplicity of blow-up rings of equimultiple. J. Pure Appl. Algebra 183:313-327]. In this paper, we will construct generalized joint reductions generated by maximal weak-(FC)-sequences of a set of arbitrary ideals. We showed that the mixed multi-plicity of ideals and the mixed multiplicity of their reductions are the same. The paper also determines the vanishing and non-vanishing of mixed multiplicities and as an application of above results we compute mixed multiplicities and the multiplicity of multi-graded Rees algebras in some particular cases. Copyright © 2004 by Marcel Dekker, Inc. |
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