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Toplam kayıt 5, listelenen: 1-5
Asymptotically lacunary I-invariant statistical equivalence of sequences of sets defined by a modulus function
(2018)
In this paper, we introduce the concepts of strongly asymptotically lacunary I-invariant equivalence, f-asymptotically lacunary I-invariant equivalence, strongly f-asymptotically lacunary I-invariant equivalence and ...
Linear functionals connected with strong double cesaro summability
(2019)
D. Borwein characterized linear functionals on the normed linear spaces wp and Wp. In this paper we extend his results by presenting definitions for the double strong Cesaro mean. Using these new
notions of strongly ...
Asymptotically ... equivalence of double sequences defined by modulus functions
(2019)
Throughout the paper N denotes the set of all positive integers and R the set of all real numbers. The concept of convergence of a sequence of real numbers has been extended to statistical convergence independently by Fast ...
Asymptotically ... statistical equivalence of double sequences of sets defined by modulus functions
(III. International Congress on Science and Education, 2019)
Statistical convergence and ideal convergence of real numbers, which are of great importance in the theory of summability, are studied by many mathematicians. Fast (1951) and Schoenberg (1959), independently, introduced ...
Asymptotically lacunary ... equivalence for double set sequences defined by modulus functions
(2019)
Fast (1951) and Schoenberg (1959), independently, introduced concept of statistical convergence and many authors studied some properties of this concepts. Mursaleen and Edely (2003) extended this concept to the double ...