Quantitative estimates for the absolute convergence of wavelet-type series

Abstract

We establish new quantitative estimates for general systems of functions with wavelet-type dyadic structure. These estimates are applied to obtain the optimal growth of various types of Weyl multipliers for certain wavelet-type systems. Some of our results are sufficiently general to allow the orthogonality assumption to be removed. In particular, as a consequence of these estimates we show that the condition equation* Σn=1∞1nw(n)<∞ equation* is necessary and sufficient for an increasing sequence w(n) to be an almost everywhere unconditional convergence Weyl multiplier for an arbitrary wavelet-type system. We also prove that n is an almost everywhere convergence Weyl multiplier for any rearranged wavelet-type system, and that this bound is optimal.