Non-removable ideals in commutative topological algebras with separately continuous multiplication.
Collectanea Mathematica (1991)
- Volume: 42, Issue: 3, page 189-198
- ISSN: 0010-0757
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topMüller, Vladimir. "Non-removable ideals in commutative topological algebras with separately continuous multiplication.." Collectanea Mathematica 42.3 (1991): 189-198. <http://eudml.org/doc/42515>.
@article{Müller1991,
abstract = {An ideal in a commutative topological algebra with separately continuous multiplication is non-removable if and only if it consists locally of joint topological divisors of zero. Also, any family of non-removable ideals can be removed simultanously.},
author = {Müller, Vladimir},
journal = {Collectanea Mathematica},
keywords = {Algebra de Banach; Algebra topológica; Algebras conmutativas; Ideales; joint topological divisors of zero; non-removable ideals},
language = {eng},
number = {3},
pages = {189-198},
title = {Non-removable ideals in commutative topological algebras with separately continuous multiplication.},
url = {http://eudml.org/doc/42515},
volume = {42},
year = {1991},
}
TY - JOUR
AU - Müller, Vladimir
TI - Non-removable ideals in commutative topological algebras with separately continuous multiplication.
JO - Collectanea Mathematica
PY - 1991
VL - 42
IS - 3
SP - 189
EP - 198
AB - An ideal in a commutative topological algebra with separately continuous multiplication is non-removable if and only if it consists locally of joint topological divisors of zero. Also, any family of non-removable ideals can be removed simultanously.
LA - eng
KW - Algebra de Banach; Algebra topológica; Algebras conmutativas; Ideales; joint topological divisors of zero; non-removable ideals
UR - http://eudml.org/doc/42515
ER -
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