A uniqueness theorem for entire functions

Abstract

Let G(k)=∫01g(x)ekxdx, g∈ L1(0,1). The main result of this paper is the following theorem. Theorem. If k +∞|G(k)|<∞, then g=0. There exists g 0, g∈ L1(0,1), such that G(kj)=0, kj<kj+1, j ∞kj=∞, k ∞|G(k)| does not exist, k +∞|G(k)|=∞. This g oscillates infinitely often in any interval [1-δ, 1], however small δ>0 is.