Title of article
Statistical convergence and ideal convergence for sequences of functions
Author/Authors
Marek Balcerzak، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2007
Pages
15
From page
715
To page
729
Abstract
Let I ⊂ P(N) stand for an ideal containing finite sets. We discuss various kinds of statistical convergence
and I-convergence for sequences of functions with values in R or in a metric space. For real valued
measurable functions defined on a measure space (X,M,μ), we obtain a statistical version of the Egorov
theorem (when μ(X) <∞). We show that, in its assertion, equi-statistical convergence on a big set cannot
be replaced by uniform statistical convergence. Also, we consider statistical convergence in measure and
I-convergence in measure, with some consequences of the Riesz theorem. We prove that outer and inner
statistical convergences in measure (for sequences of measurable functions) are equivalent if the measure is
finite.
© 2006 Elsevier Inc. All rights reserved.
Keywords
I-Uniform convergence , Equi-statistical convergence , Statistical Egorov’s theorem , Statistical convergencein measure
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2007
Journal title
Journal of Mathematical Analysis and Applications
Record number
935472
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