On geometry of the unit ball of Paley-Wiener space over two symmetric intervals

Abstract

Let PWS1 be the space of integrable functions on R whose Fourier transform vanishes outside S, where S = [-σ,-][,σ], 0<<σ. In the case >σ/2, we present a complete description of the set of extreme and the set of exposed points of the unit ball of PW1S. The structure of these sets becomes more complicated when <σ/2.