Differentiation properties of class L1([0,1]2) with respect to two different basis of rectangles

Abstract

It is a well-known result by Saks Saks1934 that there exists a function f ∈ L1(R2) so that for almost every (x,y)∈ R2 \[ diam R→ 0, \\ (x,y) ∈ R ∈ R|1|R|∫R f(x,y)\, dxdy|=∞, \] where R=\[a,b)× [c,d) a<b, c<d\. In this note we address the following question: assume we have two different collections of rectangles; under which conditions there exists a function f ∈ L1(R2) so that its integral averages are divergence with respect to one collection and convergence with respect to another? More specifically, let D, C ⊂ (0,1] and consider rectangles with side lengths in D and respectively in C. We show that if the sets D and C are sufficient ``far" from each other, then such a function can be constructed. We also show that in the class of positive functions our condition is also necessary for such a function to exist.