The resolution of the universal ring for modules of rank zero and projective dimension two
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- 作者:Andrew R. Kustin
- 关键词:Buchsbaum– ; Eisenbud multipliers ; Finite free resolution ; Koszul complex ; Universal resolution
- 刊名:Journal of Algebra
- 出版年:2007
- 出版时间:1 April 2007
- 年:2007
- 卷:310
- 期:1
- 页码:261-289
- 全文大小:286 K
文摘
Hochster established the existence of a commutative noetherian ring and a universal resolution of the form such that for any commutative noetherian ring S and any resolution equal to 0→Se→Sf→Sg→0, there exists a unique ring homomorphism with . In the present paper we assume that f=e+g and we find a resolution of by free -modules, where is a polynomial ring over the ring of integers. The resolution is not minimal; but it is straightforward, coordinate free, and independent of characteristic. Furthermore, one can use to calculate . If e and g both are at least 5, then is not a free abelian group; and therefore, the graded Betti numbers in the minimal resolution of by free -modules depend on the characteristic of the field . We record the modules in the minimal resolution of in terms of the modules which appear when one resolves divisors over the determinantal ring defined by the 2×2 minors of an e×g matrix.