On statistically \(l_{q}\)-complete and \(c_{0s}\) in measure convergences of sequences of measurable functions
DOI10.1515/JAA-2016-0017zbMath1353.28001OpenAlexW2549476393MaRDI QIDQ350341
N. Papanastasiou, Xenofon Dimitriou, Christos Papachristodoulos
Publication date: 7 December 2016
Published in: Journal of Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/jaa-2016-0017
statistical convergenceasymptotic convergence\(c_{0}\)\(c_{0s}\)\(c_{0s}\)-\(\mu\) convergence\(l_{q}\)\(L^{0}(\Gamma)\)\(s\)-\(l_{q}\)-completest-al-u convergence
Convergence and divergence of series and sequences (40A05) Measurable and nonmeasurable functions, sequences of measurable functions, modes of convergence (28A20)
Related Items (1)
Cites Work
- Unnamed Item
- On statistically \(l_{q}\)-complete and \(c_{0s}\) in measure convergences of sequences of measurable functions
- \(p\)-\(q\)-convergence of sequences of measurable functions
- \(p\)-convergence in measure of a sequence of measurable functions and corresponding minimal elements of \(c_{0}\)
- On summing sequences of O'S and 1'S
- Two valued measures and summability
- I and I*-convergence of double sequences
- ON STATISTICAL CONVERGENCE
- Sur la convergence statistique
- Generalized Asymptotic Density
This page was built for publication: On statistically \(l_{q}\)-complete and \(c_{0s}\) in measure convergences of sequences of measurable functions
