1. Monotone-light factorisation systems and torsion theories.
- Author
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Gran, Marino and Everaert, Tomas
- Subjects
- *
MONOTONE operators , *FACTORIZATION , *TORSION theory (Algebra) , *ABELIAN categories , *STABILITY theory , *TOPOLOGICAL groups - Abstract
Abstract: Given a torsion theory in an abelian category , the reflector to the torsion-free subcategory induces a reflective factorisation system on . It was shown by A. Carboni, G.M. Kelly, G. Janelidze and R. Paré that induces a monotone-light factorisation system by simultaneously stabilising and localising , whenever the torsion theory is hereditary and any object in is a quotient of an object in . We extend this result to arbitrary normal categories, and improve it also in the abelian case, where the heredity assumption on the torsion theory turns out to be redundant. Several new examples of torsion theories where this result applies are then considered in the categories of abelian groups, groups, topological groups, commutative rings, and crossed modules. [Copyright &y& Elsevier]
- Published
- 2013
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