Georgi R. Grozev¹ and Qazi I. Rahman²

Copyright © 1997 Georgi R. Grozev and Qazi I. Rahman. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let c∈[0,1),p>0. It is shown that if f is an entire function of exponential type cmπ and ∑n=∞∞∑μ=0m−1|f(μ)(λn)|p<∞, where {λn}n∈ℤ is a sequence of real numbers satisfying |λn−n|≤Δ<∞, |λn+u−λn|≥δ>0 for u≠0, then ∫−∞∞|f(x)|pdx<B∑n=−∞∞∑μ=0m−1|f(μ)(λn)|p, where B depends only on c,p,Δ, and δ. A sampling theorem for irregularly spaced sample points is obtained as a corollary. Our proof of the main result contains ideas which help us to obtain an extension of a theorem of R.J. Duffin and A.C. Schaeffer concerning entire functions of exponential type bounded at the points of the above sequence {λn}n∈ℤ .