论文信息 - RELATIVE ATTACHED PRIMES AND COREGULAR SEQUENCES

RELATIVE ATTACHED PRIMES AND COREGULAR SEQUENCES

We extend the existing concepts of secondary representation of a module, coregular sequence and attached prime ideals to the more general setting of any hereditary torsion theory. We prove that any $\tau$-artinian module is $\tau$-representable and that such a representation has some sort of unicity in terms of the set of $\tau$-attached prime ideals associated to it. Then we use $\tau$-coregular sequences to find a nice way to compute the relative width of a module. Finally we give some connections with the relative local homology.

L. Oyonarte | J. R. G. Rozas | Inmaculada López

[1] Nguyen Tu Cuong,et al. A local homology theory for linearly compact modules , 2007, 0709.1778.

[2] Nguyen Tu Cuong,et al. The I-adic completion and local homology for Artinian modules , 2001, Mathematical Proceedings of the Cambridge Philosophical Society.

[3] Jon P. May,et al. Derived functors of I-adic completion and local homology , 1992 .

[4] T. Albu,et al. Relative Finiteness in Module Theory , 1984 .

[5] A. Ooishi. Matlis duality and the width of a module , 1976 .

[6] O. Goldman. Rings and modules of quotients , 1969 .

[7] Eben Matlis. MODULES WITH DESCENDING CHAIN CONDITION , 1960 .