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Di Maio, Giuseppe; Kočinac, Ljubiša D. R.

Statistical convergence in topology. (English) Zbl 1155.54004

Topology Appl. 156, No. 1, 28-45 (2008).
The authors introduce and study statistical convergence in topological and uniform spaces and offer some applications to selection principles theory, function spaces and hyperspaces. In section 2 the statistical convergence of a sequence in a topological space is given and related basic properties are studied. Then the idea is considered how statistical convergence can be applied to open covers of topological spaces, and in this connection selection properties related to these covers are handled. Consequently, results concerning uniform selection properties lead us to some interesting applications on function spaces. At last the authors apply the idea of statistical convergence to selection properties on hyperspaces equipped with the so-called delta-topology.
Reviewer: Dieter Leseberg (Braunschweig)

Cited in 7 Reviews
Cited in 134 Documents

MSC:

54A20 Convergence in general topology (sequences, filters, limits, convergence spaces, nets, etc.)
54B20 Hyperspaces in general topology
54C35 Function spaces in general topology
54D20 Noncompact covering properties (paracompact, Lindelöf, etc.)
40A05 Convergence and divergence of series and sequences
40A30 Convergence and divergence of series and sequences of functions
26A03 Foundations: limits and generalizations, elementary topology of the line
11B05 Density, gaps, topology

Keywords:

asymptotic density; statistical convergence; statistical limit point; statistical cluster point; selection principles; function spaces; hyperspaces
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\textit{G. Di Maio} and \textit{L. D. R. Kočinac}, Topology Appl. 156, No. 1, 28--45 (2008; Zbl 1155.54004)
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References:

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