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arxiv: 1707.03281 · v4 · pith:KT3TRR7Snew · submitted 2017-07-11 · 🧮 math.CA · math.FA· math.GN· math.NT· math.PR

Characterizations of Ideal Cluster Points

classification 🧮 math.CA math.FAmath.GNmath.NTmath.PR
keywords mathcalclusterpointscharacterizationsconvergentidealsequencetopology
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Given an ideal $\mathcal{I}$ on $\omega$, we prove that a sequence in a topological space $X$ is $\mathcal{I}$-convergent if and only if there exists a ``big'' $\mathcal{I}$-convergent subsequence. Then, we study several properties and show two characterizations of the set of $\mathcal{I}$-cluster points as classical cluster points of a filters on $X$ and as the smallest closed set containing ``almost all'' the sequence. As a consequence, we obtain that the underlying topology $\tau$ coincides with the topology generated by the pair $(\tau,\mathcal{I})$.

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