Some new thin sets of integers in Harmonic Analysis

Abstract

We randomly construct various subsets of the integers which have both smallness and largeness properties. They are small since they are very close, in various meanings, to Sidon sets: the continuous functions with spectrum in have uniformly convergent series, and their Fourier coefficients are in p for all p>1; moreover, all the Lebesgue spaces Lq are equal for q<+∞. On the other hand, they are large in the sense that they are dense in the Bohr group and that the space of the bounded functions with spectrum in is non separable. So these sets are very different from the thin sets of integers previously known.