Strong means and the oscillation of multiple Fourier-Walsh series (Q1905285)

The author shows certain operators related to strong means of double Walsh-Fourier series are of weak type \((L\log^+ L, 1)\). It follows that if \(f\) belongs to \(L\log^+ L\) then \(\sum^n_{k= 1} \sum^m_{j= 1} |(S_{kj} f)(x)- f(x)|^\alpha= O(m, n)\), as \(m, n\to \infty\), for almost every \(x\) in the unit square \([0, 1]\times [0, 1]\).