Functions preserving slowly oscillating double sequences

Abstract

A double sequence x=\xk,l\ of points in R is slowly oscillating if for any given >0, there exist α=α()>0, δ=δ () >0, and N=N() such that |xk,l-xs,t|< whenever k,l≥ N() and k≤ s ≤ (1+α)k, l≤ t ≤ (1+δ)l. We study continuity type properties of factorable double functions defined on a double subset A× A of R2 into R, and obtain interesting results related to uniform continuity, sequential continuity, and a newly introduced type of continuity of factorable double functions defined on a double subset A× A of R2 into R.