On wavelet polynomials and Weyl multipliers

Abstract: For the wavelet type orthonormal systems $\phi_n$, we establish a new bound \begin{equation} \left|\max_{1\le m\le n}\left|\sum_{j\in G_m}\langle f,\phi_j\rangle \phi_j\right|\right|_p\lesssim \sqrt{\log (n+1)}\cdot |f|_p,\quad 1<p<\infty, \end{equation} where $G_m\subset N$ are arbitrary sets of indexes. Using this estimate, we prove that $\log n$ is an almost everywhere convergence Weyl multiplier for any orthonormal system of non-overlapping wavelet polynomials. It will also be remarked that $\log n$ is the optimal sequence in this context.