On Abel statistical convergence

Abstract

In this paper, we introduce and investigate a concept of Abel statistical continuity. A real valued function f is Abel statistically continuous on a subset E of , the set of real numbers, if it preserves Abel statistical convergent sequences, i.e. (f(pk)) is Abel statistically convergent whenever (pk) is an Abel statistical convergent sequence of points in E, where a sequence (pk) of point in is called Abel statistically convergent to a real number L if Abel density of the set \k∈: |pk-L|≥ \ is 0 for every >0. Some other types of continuities are also studied and interesting results are obtained.