A note on Sidon sets in bounded orthonormal systems
Abstract
We give a simple example of an -tuple of orthonormal elements in (actually martingale differences) bounded by a fixed constant, and hence subgaussian with a fixed constant but that are Sidon only with constant . This is optimal. The first example of this kind was given by Bourgain and Lewko, but with constant . We also include the analogous -matrix valued example, for which the optimal constant is . We deduce from our example that there are two -tuples each Sidon with constant 1, lying in orthogonal linear subspaces and such that their union is Sidon only with constant . This is again asymptotically optimal. We show that any martingale difference sequence with values in is "dominated" in a natural sense (related to our results) by any sequence of independent, identically distributed, symmetric -valued variables (e.g. the Rademacher functions). We include a self-contained proof that any sequence that is the union of two Sidon sequences lying in orthogonal subspaces is such that is Sidon.
Keywords
Cite
@article{arxiv.1704.02969,
title = {A note on Sidon sets in bounded orthonormal systems},
author = {Gilles Pisier},
journal= {arXiv preprint arXiv:1704.02969},
year = {2023}
}
Comments
v2 and v3: Minor corrections. To appear in Journal of Fourier analysis and applications