Non-removable ideals in commutative topological algebras with separately continuous multiplication
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An ideal in a commutative topological algebra with separately continuous multiplication is non-removable if and only i fit consists locally of joint topological divisors of zero. Also, any family of non-removable ideals can be removed simultanously.
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Müller, Vladimir , 1950-. «Non-removable ideals in commutative topological algebras with separately continuous multiplication». Collectanea Mathematica, vol.VOL 42, n.º 3, pp. 189-98, https://raco.cat/index.php/CollectaneaMathematica/article/view/56781.
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