A lower bound in Nehari's theorem on the polydisc

Abstract

By theorems of Ferguson and Lacey (d=2) and Lacey and Terwilleger (d>2), Nehari's theorem is known to hold on the polydisc Dd for d>1, i.e., if H is a bounded Hankel form on H2(Dd) with analytic symbol , then there is a function φ in L∞(d) such that is the Riesz projection of φ. A method proposed in Helson's last paper is used to show that the constant Cd in the estimate \|φ\|∞ Cd \|H\| grows at least exponentially with d; it follows that there is no analogue of Nehari's theorem on the infinite-dimensional polydisc.