Nehari's Theorem and Hardy's inequality for Paley--Wiener spaces
Abstract
Recently it was proven that for a convex subset of Rn that has infinitely many extreme vectors, the Nehari theorem fails, that is, there exists a bounded Hankel operator φ on the Paley--Wiener space () that does not admit a bounded symbol. In this paper we examine whether Nehari's theorem can hold under the stronger assumption that the Hankel operator φ is in the Schatten class Sp(()). We prove that this fails for p>4 for any convex subset of Rn, n≥2, of boundary with a C2 neighborhood of nonzero curvature. Furthermore we prove that for a polytope P in Rn, the inequality ∫2P|f(x)|m(P (x-P))dx≤ C(P)\|f\|L1, holds for all f∈ 1(2P), and consequently any Hilbert--Schmidt Hankel operator on a Paley--Wiener space of a polytope is generated by a bounded function.
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