Sequences of dilations and translations equivalent to the Haar system in Lp-spaces

Abstract

Let f=Σk=0∞ckh2k, where \hn\ is the classical Haar system, ck∈C. Given a p∈ (1,∞), we find the sharp conditions, under which the sequence \fn\n=1∞ of dilations and translations of f is a basis in the space Lp[0,1], equivalent to \hn\n=1∞. The results obtained depend substantially on whether p 2 or 1<p<2 and include as the endpoints of the Lp-scale the spaces BMOd and Hd1. The proofs are based on an appropriate splitting the set of positive integers N=d=1∞ Nd so that the equivalence of \fn\n=1∞ to the Haar system in Lp would be ensured by the fact that \fn\n∈ Nd is a basis in the subspace [hm,m∈ Nd]Lp, equivalent to the Haar subsequence \hn\n∈ Nd for every d=1,2,….