Difference between revisions of "Kelley continuum"
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A [[continuum]] $X$ is called a ''Kelley continuum'' if for every subcontinuum $K$ of $X$, for every point $p \in K$, and for every sequence $p_n\to p$ there are continua $K_n$ such that $p_n \in K_n $ and $K_n\to K$. | A [[continuum]] $X$ is called a ''Kelley continuum'' if for every subcontinuum $K$ of $X$, for every point $p \in K$, and for every sequence $p_n\to p$ there are continua $K_n$ such that $p_n \in K_n $ and $K_n\to K$. | ||
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Other names used: property (3.2), a property of Kelley, the property of Kelley, Kelley’s property, property $(\kappa)$. | Other names used: property (3.2), a property of Kelley, the property of Kelley, Kelley’s property, property $(\kappa)$. | ||
Latest revision as of 16:47, 27 August 2014
A continuum $X$ is called a Kelley continuum if for every subcontinuum $K$ of $X$, for every point $p \in K$, and for every sequence $p_n\to p$ there are continua $K_n$ such that $p_n \in K_n $ and $K_n\to K$.
Other names used: property (3.2), a property of Kelley, the property of Kelley, Kelley’s property, property $(\kappa)$.
