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

Abstract: A sequence of real numbers ${x_{n}}{n\in \mathbb{N}}$ is said to be $\alpha \beta$-statistically convergent of order $\gamma$ (where $0<\gamma\leq 1$) to a real number $x$ \cite{a} if for every $\delta>0,$ $$\underset{n\rightarrow \infty} {\lim} \frac{1}{(\beta{n} - \alpha_{n} + 1)^\gamma}~ |{k \in [\alpha_n,\beta_n] : |x_{k}-x|\geq \delta }|=0.$$ where ${\alpha_{n}}{n\in \mathbb{N}}$ and ${\beta{n}}{n\in \mathbb{N}}$ be two sequences of positive real numbers such that ${\alpha{n}}{n\in \mathbb{N}}$ and ${\beta{n}}{n\in \mathbb{N}}$ are both non-decreasing, $\beta{n}\geq \alpha_{n}$ $\forall ~n\in \mathbb{N},$ ($\beta_{n}-\alpha_{n})\rightarrow \infty$ as $n\rightarrow \infty.$ In this paper we study a related concept of convergences in which the value $|x_{k}-x|$ is replaced by $P(|X_{k}-X|\geq \varepsilon)$ and $E(|X_{k}-X|^{r})$ repectively (Where $X, X_k$ are random variables for each $k\in \mathbb{N}$, $\varepsilon>0$, $P$ denote the probability, $E$ denote the expectation) and we call them $\alpha \beta$-statistical convergence of order $\gamma$ in probability and $\alpha\beta$-statistical convergence of order $\gamma$ in $r^{\mbox{th}}$ expectation respectively. The results are applied to build the probability distribution for $\alpha\beta$-strong $p$-Ces$\grave{\mbox{a}}$ro summability of order $\gamma$ in probability and $\alpha\beta$-statistical convergence of order $\gamma$ in distribution. Our main objective is to interpret a relational behavior of above mentioned four convergences.