Cotorsion pairs generated by modules of bounded projective dimension

“…In [6], Herbera and the author proved that, for a large class of rings including all commutative domains, the right Ext-orthogonal to P 1 is the class of divisible modules. From this fact it follows that every module over an almost perfect domain has a divisible envelope and in [21], Salce conjectured that the commutative domains for which every module admits a divisible envelope are exactly the almost perfect domains.…”

Section: Introductionmentioning

confidence: 99%

DIVISIBLE ENVELOPES, $\mathcal{P}_1$-COVERS AND WEAK-INJECTIVE MODULES

Bazzoni

2010

J. Algebra Appl.

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We consider the problem of characterizing the commutative domains such that every module admits a divisible envelope or a P 1 -cover, where P 1 is the class of modules of projective dimension at most one. We prove that each one of the two conditions is satisfied exactly for the class of almost perfect domains, that is commutative domains such that all of their proper quotients are perfect rings. Moreover, we show that the class of weak-injective modules over a commutative domain is closed under direct sums if and only if the domain is almost perfect.

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“…Every countably presented flat module F is a countable direct limit of finitely generated projective (or even free) modules (see [23]); hence F has projective dimension at most one, by [19]. Now, by [4,Corollary 8.2], for any commutative domain R, the class of divisible R-modules is the right Ext-orthogonal to the class of modules of projective dimension at most one, that is Ext Recall that a commutative domain R is called a valuation domain if its ideals form a chain with respect to inclusion. For proofs of the following facts, unexplained terminology, and other results on modules over valuation domains we refer to [12,XIII].…”

Section: Preliminariesmentioning

confidence: 99%