Original scientific paper
Lacunary statistical convergence of double sequences
R. F. Patterson
E. Savaş
Abstract
In 1978 Freedman, Sember, and Raphael presented a definition for
lacunary refinement as follows: $\rho=\{\bar{k}_{r}\}$ is called a
lacunary refinement of the lacunary sequence $\theta =\{k_{r}\}$
if $\{k_{r}\}\subseteq \{\bar{k}_{r}\}$. They use this definition
to present one side inclusion theorem with respect to the refined
and non refined sequence. In 2000 Li presented the other side of
the inclusion. In this paper we shall present a multidimensional
analogue to the notion of refinement of lacunary sequences and use
this definition to present both sides of the above inclusion
theorem. In addition, we shall also present a notion of double
lacunary statistically Cauchy and use this definition to establish
that it is equivalent to the $S_{\theta_{r,s}}$-P-convergence.
Keywords
double lacunary sequences; P-convergent
Hrčak ID:
660
URI
Publication date:
23.6.2005.
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