International Journal of Mathematics and Mathematical Sciences (Jan 1980)

Mean-periodic functions

  • Carlos A. Berenstein,
  • B. A. Taylor

DOI
https://doi.org/10.1155/S0161171280000154
Journal volume & issue
Vol. 3, no. 2
pp. 199 – 235

Abstract

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We show that any mean-periodic function f can be represented in terms of exponential-polynomial solutions of the same convolution equation f satisfies, i.e., u∗f=0(μ∈E′(ℝn)). This extends to n-variables the work of L. Schwartz on mean-periodicity and also extends L. Ehrenpreis' work on partial differential equations with constant coefficients to arbitrary convolutors. We also answer a number of open questions about mean-periodic functions of one variable. The basic ingredient is our work on interpolation by entire functions in one and several complex variables.

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