Every topological category is convenient for Gelfand Duality.
Hans-E. Porst; Manfred B. Wischnewski
Manuscripta mathematica (1978)
- Volume: 25, page 169-204
- ISSN: 0025-2611; 1432-1785/e
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topPorst, Hans-E., and Wischnewski, Manfred B.. "Every topological category is convenient for Gelfand Duality.." Manuscripta mathematica 25 (1978): 169-204. <http://eudml.org/doc/154564>.
@article{Porst1978,
author = {Porst, Hans-E., Wischnewski, Manfred B.},
journal = {Manuscripta mathematica},
keywords = {Topological Category; Monoidally Closed Category; Cotensors; (E,M)- Factorization; Topological Functors; Galois-Correspondence; Generalized Closure Operators; Gelfand-Naimark Duality; Topological Categories; Monadic Functors},
pages = {169-204},
title = {Every topological category is convenient for Gelfand Duality.},
url = {http://eudml.org/doc/154564},
volume = {25},
year = {1978},
}
TY - JOUR
AU - Porst, Hans-E.
AU - Wischnewski, Manfred B.
TI - Every topological category is convenient for Gelfand Duality.
JO - Manuscripta mathematica
PY - 1978
VL - 25
SP - 169
EP - 204
KW - Topological Category; Monoidally Closed Category; Cotensors; (E,M)- Factorization; Topological Functors; Galois-Correspondence; Generalized Closure Operators; Gelfand-Naimark Duality; Topological Categories; Monadic Functors
UR - http://eudml.org/doc/154564
ER -
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