Abstract
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.
Citation
J. R. Garcia Rozas. Inmaculada López. Luis Oyonarte. "RELATIVE ATTACHED PRIMES AND COREGULAR SEQUENCES." Taiwanese J. Math. 17 (3) 1095 - 1114, 2013. https://doi.org/10.11650/tjm.17.2013.3055
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