Bounds on moments of weighted sums of finite Riesz products

Abstract

Let nj be a lacunary sequence of integers, such that nj+1/nj≥ r. We are interested in linear combinations of the sequence of finite Riesz products Πj=1N(1+(nj t)). We prove that, whenever the Riesz products are normalized in Lp norm (p≥ 1) and when r is large enough, the Lp norm of such a linear combination is equivalent to the p norm of the sequence of coefficients. In other words, one can describe many ways of embedding p into Lp based on Fourier coefficients. This generalizes to vector valued Lp spaces.