English

A uniqueness theorem for entire functions

Complex Variables 2010-01-05 v1

Abstract

Let G(k)=01g(x)ekxdxG(k)=\int_0^1g(x)e^{kx}dx, gL1(0,1)g\in L^1(0,1). The main result of this paper is the following theorem. {\bf Theorem}. {\it If lim supk+G(k)<\limsup_{k\to +\infty}|G(k)|<\infty, then g=0g=0. There exists g≢0g\not\equiv 0, gL1(0,1)g\in L^1(0,1), such that G(kj)=0G(k_j)=0, kj<kj+1k_j<k_{j+1}, limjkj=\lim_{j\to \infty}k_j=\infty, limkG(k)\lim_{k\to \infty}|G(k)| does not exist, lim supk+G(k)=\limsup_{k\to +\infty}|G(k)|=\infty. This gg oscillates infinitely often in any interval [1δ,1][1-\delta, 1], however small δ>0\delta>0 is.}

Keywords

Cite

@article{arxiv.1001.0367,
  title  = {A uniqueness theorem for entire functions},
  author = {A. G. Ramm},
  journal= {arXiv preprint arXiv:1001.0367},
  year   = {2010}
}
R2 v1 2026-06-21T14:30:21.768Z