Oscillation of Fourier Integrals with a spectral gap
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🧮 math.CA
math.CV
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fourierbeurlingcannotchangesconditionconstructdensitydistribution
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Suppose that Fourier transform of a function f is zero on the interval [-a,a]. We prove that the lower density of sign changes of f is at least a/pi, provided that f is a locally integrable temperate distribution in the sense of Beurling, with non-quasianalytic weight. We construct an example showing that the last condition cannot be omitted.
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