Extending localization functors

Carles Casacuberta; Armin Frei; G. C. Tan

doi:10.1016/0022-4049(94)00099-5

Extending localization functors

Carles Casacuberta, Armin Frei, G. C. Tan

Departamento de Matemáticas

Producción científica: Contribución a una revista › Artículo › Investigación › revisión exhaustiva

7 Citas (Scopus)

Resumen

We prove that, under suitable restrictions, an idempotent monad t defined on a full subcategory A of a category C can be extended to an idempotent monad T on C in a universal (terminal) way. Our result applies in particular to the case when t is P-localization of nilpotent groups (where P denotes a set of primes) and C is the category of all groups. The corresponding monad T on C is, in a certain precise sense, the best idempotent approximation to the usual Zp-completion of groups; it turns out to be a strict epimorphic image of Bousfield's HZp-localization. © 1995.

Idioma original	Inglés
Páginas (desde-hasta)	149-165
Publicación	Journal of Pure and Applied Algebra
Volumen	103
N.º	2
DOI	https://doi.org/10.1016/0022-4049(94)00099-5
Estado	Publicada - 15 sept 1995

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title = "Extending localization functors",

abstract = "We prove that, under suitable restrictions, an idempotent monad t defined on a full subcategory A of a category C can be extended to an idempotent monad T on C in a universal (terminal) way. Our result applies in particular to the case when t is P-localization of nilpotent groups (where P denotes a set of primes) and C is the category of all groups. The corresponding monad T on C is, in a certain precise sense, the best idempotent approximation to the usual Zp-completion of groups; it turns out to be a strict epimorphic image of Bousfield's HZp-localization. {\textcopyright} 1995.",

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T1 - Extending localization functors

AU - Casacuberta, Carles

AU - Frei, Armin

AU - Tan, G. C.

PY - 1995/9/15

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N2 - We prove that, under suitable restrictions, an idempotent monad t defined on a full subcategory A of a category C can be extended to an idempotent monad T on C in a universal (terminal) way. Our result applies in particular to the case when t is P-localization of nilpotent groups (where P denotes a set of primes) and C is the category of all groups. The corresponding monad T on C is, in a certain precise sense, the best idempotent approximation to the usual Zp-completion of groups; it turns out to be a strict epimorphic image of Bousfield's HZp-localization. © 1995.

AB - We prove that, under suitable restrictions, an idempotent monad t defined on a full subcategory A of a category C can be extended to an idempotent monad T on C in a universal (terminal) way. Our result applies in particular to the case when t is P-localization of nilpotent groups (where P denotes a set of primes) and C is the category of all groups. The corresponding monad T on C is, in a certain precise sense, the best idempotent approximation to the usual Zp-completion of groups; it turns out to be a strict epimorphic image of Bousfield's HZp-localization. © 1995.

UR - https://www.scopus.com/pages/publications/0000509656

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DO - 10.1016/0022-4049(94)00099-5

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JO - Journal of Pure and Applied Algebra

JF - Journal of Pure and Applied Algebra

IS - 2

ER -

Extending localization functors

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