When is \(C(X)\) polynomially ideal? (Q906296)
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scientific article; zbMATH DE number 6533977
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | When is \(C(X)\) polynomially ideal? |
scientific article; zbMATH DE number 6533977 |
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When is \(C(X)\) polynomially ideal? (English)
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21 January 2016
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For an \(f\)-algebra and an ideal \(\mathfrak a\), a notion of being polynomially \(\mathfrak a\)-ideal is introduced. It is shown that if the algebra is bounded inversion closed and \(\mathfrak a\) is an intersection of maximal ideals, this notion is equivalent to idempotents lifting modulo \(\mathfrak a\). For spaces of continuous functions on a Tychonoff space, the notion is then linked to the space being a \(P\)-space and being strongly zero-dimensional.
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commutative \(f\)-algebra
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idempotent element
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polynomially ideal
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intersection of maximal ideals
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completely regular space
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lattice-ordered algebra
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