Approximation of entire functions of exponential type by trigonometric sums

Abstract

Let σ>0. For 1 p ∞, the Bernstein space Bpσ is a Banach space of all f∈ Lp(R) such that f is bandlimited to σ; that is, the distributional Fourier transform of f is supported in [-σ, σ]. We study the approximation of\ f∈ Bpσ by finite trigonometric sums \[ Pτ(x)=τ(x) Σ|k| στ/πck,τ eiπτk x \] in Lp norm on R as\ τ∞,\ where\ τ denotes the indicator function of [-τ, τ]$.