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On the zeros and Fourier transforms of entire functions in the Paley–Wiener space

Published online by Cambridge University Press:  24 October 2008

Konstantin M. Dyakonov
Affiliation:
Department of Mathematics II, St. Petersburg University of Electrical Engineering, Ul. Prof. Popova 5, St. Petersburg, 197376, Russia

Abstract

Let f be an entire function of the form

where ø is a function in L2(ℝ) with compact support. If f| is real-valued then, for obvious reasons, (a) the supporting interval for ø is symmetric with respect to the origin, and

Assuming that f has no zeros in {Im z > 0}, we prove that the converse is also true: (a) and (b) together imply that f| takes values in αℝ, where α is a fixed complex number.

The proof relies on a certain formula involving the Dirichlet integral, which may be interesting on its own.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1996

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References

REFERENCES

[1]Carleson, L.. A representation formula for the Dirichlet integral. Math. Zeit. 73 (1960), 190196.Google Scholar
[2]Garnett, J. B.. Bounded analytic functions (Academic Press, 1981).Google Scholar
[3]Koosis, P.. The logarithmic integral (Cambridge University Press, 1988).Google Scholar