On Variations of statistical ward continuity

Abstract

In this paper, we introduce a concept of statistically p-quasi-Cauchyness of a real sequence in the sense that a sequence (αk) is statistically p-quasi-Cauchy if n→∞1n|\k≤ n: |αk+p-αk|≥\|=0 for each >0. A function f is called statistically p-ward continuous on a subset A of the set of real umbers R if it preserves statistically p-quasi-Cauchy sequences, i.e. the sequence f(x)=(f(αn)) is statistically p-quasi-Cauchy whenever α=(αn) is a statistically p-quasi-Cauchy sequence of points in A. It turns out that a real valued function f is uniformly continuous on a bounded subset A of R if there exists a positive integer p such that f preserves statistically p-quasi-Cauchy sequences of points in A.