On the coexistence of divergence and convergence phenomena for the Fourier-Haar series for non-negative functions

Abstract

Let \Hn,m\n,m∈ N be the two dimensional Haar system and Sn,mf be the rectangular partial sums of its Fourier series with respect to some f∈ L1([0,1)2). Let N, M⊂ N be two disjoint subsets of indices. We give a necessary and sufficient condition on the sets N, M so that for some f ∈ L1([0,1)2), f ≥ 0 one has for almost every z∈ [0,1)2 that n,m → ∞;n,m ∈ NSn,mf(z)=f(z) and n,m → ∞;n,m ∈ M|Sn,mf(z)|=∞. The proof uses some constructions from the theory of low-discrepancy sequences such as the van der Corput sequence and an associated tiling of the plane. This extends some earlier results.