A notion of αβ-statistical convergence of order γ in probability

Abstract

A sequence of real numbers \xn\n∈ N is said to be α β-statistically convergent of order γ (where 0<γ≤ 1) to a real number x a if for every δ>0, n→ ∞ 1(βn - αn + 1)γ~ |\k ∈ [αn,βn] : |xk-x|≥ δ \|=0. where \αn\n∈ N and \βn\n∈ N be two sequences of positive real numbers such that \αn\n∈ N and \βn\n∈ N are both non-decreasing, βn≥ αn ∀ ~n∈ N, (βn-αn)→ ∞ as n→ ∞. In this paper we study a related concept of convergences in which the value |xk-x| is replaced by P(|Xk-X|≥ ) and E(|Xk-X|r) repectively (Where X, Xk are random variables for each k∈ N, >0, P denote the probability, E denote the expectation) and we call them α β-statistical convergence of order γ in probability and αβ-statistical convergence of order γ in rth expectation respectively. The results are applied to build the probability distribution for αβ-strong p-Cesaro summability of order γ in probability and αβ-statistical convergence of order γ in distribution. Our main objective is to interpret a relational behavior of above mentioned four convergences.