论文信息 - The Signature of the Chern Coefficients of Local Rings

The Signature of the Chern Coefficients of Local Rings

This paper considers the following conjecture: If $R$ is an unmixed, equidimensional local ring that is a homomorphic image of a Cohen-Macaulay local ring, then for any ideal $J$ generated by a system of parameters, the Chern coefficient $e_1(J)< 0$ is equivalent to $R$ being non Cohen-Macaulay. The conjecture is established if $R$ is a homomorphic image of a Gorenstein ring, and for all universally catenary integral domains containing fields. Criteria for the detection of Cohen-Macaulayness in equi-generated graded modules are derived.

W. Vasconcelos | L. Ghezzi | Jooyoun Hong

[1] M. Rossi,et al. Hilbert Functions of Filtered Modules , 2007, 0710.2346.

[2] M. Rossi,et al. On the Chern number of a filtration , 2008, 0804.4438.

[3] W. Vasconcelos. The Chern coefficients of local rings , 2008, 0802.0205.

[4] W. Vasconcelos,et al. Normalization of Ideals and Briancon-Skoda Numbers , 2005, math/0508211.

[5] S. Goto,et al. Hilbert coefficients and Buchsbaumness of associated graded rings , 2003 .

[6] S. Huckaba,et al. Hilbert Coefficients and the Depths of Associated Graded Rings , 1997 .

[7] Edgar E. Enochs,et al. On Cohen-Macaulay rings , 1994 .

[8] Santiago Zarzuela Armengou. Balanced big Cohen-Macaulay modules and flat extensions of rings , 1987, Mathematical Proceedings of the Cambridge Philosophical Society.

[9] R. Gilmer,et al. The Noetherian property for quotient rings of infinite polynomial rings , 1979 .

[10] W. Vasconcelos. Reflexive modules over Gorenstein rings , 1968 .

[11] D. Northcott. A Note on the Coefficients of the Abstract Hilbert Function , 1960 .