Upward and downward statistical continuities

Abstract

A real valued function f defined on a subset E of R, the set of real numbers, is statistically upward continuous if it preserves statistically upward half quasi-Cauchy sequences, is statistically downward continuous if it preserves statistically downward half quasi-Cauchy sequences; and a subset E of R, is statistically upward compact if any sequence of points in E has a statistically upward half quasi-Cauchy subsequence, is statistically downward compact if any sequence of points in E has a statistically downward half quasi-Cauchy subsequence where a sequence (xn) of points in R is called statistically upward half quasi-Cauchy if \[ n→∞1n|\k≤ n: xk-xk+1≥ \|=0 \] is statistically downward half quasi-Cauchy if \[ n→∞1n|\k≤ n: xk+1-xk≥ \|=0 \] for every >0. We investigate statistically upward continuity, statistically downward continuity, statistically upward half compactness, statistically downward half compactness and prove interesting theorems. It turns out that uniform limit of a sequence of statistically upward continuous functions is statistically upward continuous, and uniform limit of a sequence of statistically downward continuous functions is statistically downward continuous.