Journal of Inequalities and Applications (Jan 2010)

Slow Growth for Universal Harmonic Functions

  • M. Carmen Gómez-Collado,
  • Félix Martínez-Giménez,
  • Alfredo Peris,
  • Francisco Rodenas

DOI
https://doi.org/10.1155/2010/253690
Journal volume & issue
Vol. 2010

Abstract

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Given any continuous increasing function ϕ:[0,+∞[→]0,+∞[ such that lim⁡t→∞log⁡ϕ(t)/log⁡t=+∞, we show that there are harmonic functions H on ℝN satisfying the inequality |H(x)|≤ϕ(∥x∥) for every x∈ℝN, which are universal with respect to translations. This answers positively a problem of D. H. Armitage (2005). The proof combines techniques of Dynamical Systems and Operator Theory, and it does not need any result from Harmonic Analysis.