Half quasi-Cauchy sequences

Abstract

A real function f is ward continuous if f preserves quasi-Cauchyness, i.e. (f(xn)) is a quasi-Cauchy sequence whenever (xn) is quasi-Cauchy; and a subset E of R is quasi-Cauchy compact if any sequence x=(xn) of points in E has a quasi-Cauchy subsequence where R is the set of real numbers. These known results suggest to us introducing a concept of upward (respectively, downward) half quasi-Cauchy continuity in the sense that a function f is upward (respectively, downward) half quasi-Cauchy continuous if it preserves upward (respectively, downward) half quasi-Cauchy sequences, and a concept of upward (respectively, downward) half quasi-Cauchy compactness in the sense that a subset E of R is upward (respectively, downward) half quasi-Cauchy compact if any sequence of points in E has an upward (respectively, downward) half quasi-Cauchy subsequence. We investigate upward(respectively, downward) half quasi-Cauchy continuity and upward (respectively, downward) half quasi-Cauchy compactness, and prove related theorems.