Henry Helson meets other big shots -- A brief survey

Abstract

A theorem of Henry Helson shows that for every ordinary Dirichlet series Σ an n-s with a square summable sequence (an) of coefficients, almost all vertical limits Σ an (n) n-s, where : N T is a completely multiplicative arithmetic function, converge on the right half-plane. We survey on recent improvements and extensions of this result within Hardy spaces of Dirichlet series -- relating it with some classical work of Bohr, Banach, Carleson-Hunt, Ces\`aro, Hardy-Littlewood, Hardy-Riesz, Menchoff-Rademacher, and Riemann.