English

On uniformly bounded orthonormal Sidon systems

Functional Analysis 2023-04-12 v6 Probability

Abstract

In answer to a question raised recently by Bourgain and Lewko, we show, with their paper's terminology, that any uniformly bounded ψ2(C)\psi_2 (C)-orthonormal system (ψ2(C)\psi_2 (C) is a variant of subGaussian)is 2-fold tensor Sidon. This sharpens their result that it is 5-fold tensor Sidon. The proof is somewhat reminiscent of the author's original one for (Abelian) group characters, based on ideas due to Drury and Rider. However, we use Talagrand's majorizing measure theorem in place of Fernique's metric entropy lower bound. We also show that a uniformly bounded orthonormal system is randomly Sidon iff it is 4-fold tensor Sidon, or equivalently kk-fold tensor Sidon for some (or all) k4k\ge 4. Various generalizations are presented, including the case of random matrices, for systems analogous to the Peter-Weyl decomposition for compact non-Abelian groups. In the latter setting we also include a new proof of Rider's unpublished result that randomly Sidon sets are Sidon, which implies that the union of two Sidon sets is Sidon.

Keywords

Cite

@article{arxiv.1602.02430,
  title  = {On uniformly bounded orthonormal Sidon systems},
  author = {Gilles Pisier},
  journal= {arXiv preprint arXiv:1602.02430},
  year   = {2023}
}

Comments

v3: randomly Sidon implies four-fold tensor Sidon. v6: preceding is extended to matrix valued case, also an illustrative-hopefully illuminating-example is presented. Terminolgy is improved

R2 v1 2026-06-22T12:45:05.442Z