Duality, BMO and Hankel operators on Bernstein spaces

Abstract

In this paper we deal with the problem of describing the dual space (B1)* of the Bernstein space B1, that is the space of entire functions of exponential type at most >0 whose restriction to the real line is Lebesgue integrable. We provide several characterisations, showing that such dual space can be described as a quotient of the space of entire functions of exponential type whose restrictions to the real line is Lebesgue integrable. We provide several characterisations, showing that such dual space can be described as a quotient of the space of entire functions of exponential type whose restrictions to the real line is in a suitable BMO-type space, or as the space of symbols b for which the Hankel operatorc Hb is bounded on the Paley-Wiener space B2/2. We also provide a characterisation of (B1)* as the BMO space w.r.t. the Clark measure of the inner function ei z on the upper half-plane, in analogy with the known description of the dual of backward-shift invariant 1-spaces on the torus. Furthermore, we show that the orthogonal projection P\ : L2(R) B2 induces a bounded operator from L∞(R) onto (B1)*. Finally, we show that B1 is the dual space of the suitable VMO-type space or as the space of symbols b for which the Hankel opertor Hb on the Paley-Wiener space B2k/2 is compact.