The dyadic Cesàro operator on \(\mathbb R_+\) (Q5933683)

In this paper the authors consider the dyadic Cesàro operator \(C\) which is defined for functions in the space \(L^1:= L^1(\mathbb R_+)\) by the Walsh-Fourier transform \(\widehat{(Cf)}(x)=\frac{1}{x}\int^x_0\hat f(u) du \;(x>0)\). The operator \(C\) coincides on \(L^1\) with the sum of certain local dyadic wavelet operators \(W\). The authors prove that \(W\) is bounded from \(L^p\) to \(L^p\) if \(1\leq p<\infty\) and it is unbounded on \(L^{\infty}\).