Statistical Order Convergence and Statistically Relatively Uniform Convergence in Riesz Spaces
Copyright policy )Statistical Order Convergence and Statistically Relatively Uniform Convergence in Riesz Spaces
A new concept of statistically e-uniform Cauchy sequences is introduced to study statistical order convergence, statistically relatively uniform convergence, and norm statistical convergence in Riesz spaces. We prove that, for statistically e-uniform Cauchy sequences, these three kinds of convergence for sequences coincide. Moreover, we show that the statistical order convergence and the statistically relatively uniform convergence need not be equivalent. Finally, we prove that, for monotone sequences in Banach lattices, the norm statistical convergence coincides with the weak statistical convergence.
- Xiamen University China (People's Republic of)
- Northeast Normal University China (People's Republic of)
statistical order convergence, QA1-939, Summability in abstract structures, Riesz spaces, Mathematics, Ideal and statistical convergence
statistical order convergence, QA1-939, Summability in abstract structures, Riesz spaces, Mathematics, Ideal and statistical convergence
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