Back to Search
Start Over
Oscillation of Fourier Integrals with a spectral gap
- Publication Year :
- 2003
-
Abstract
- 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.<br />1 Figure
- Subjects :
- Mathematics(all)
Spectral gap
General Mathematics
Entire function
Disjoint sets
Équation de la chaleur
01 natural sciences
symbols.namesake
Trou spectral
Sign changes
Fonctions entières
Classical Analysis and ODEs (math.CA)
FOS: Mathematics
42A38 46F12 46F20
Complex Variables (math.CV)
0101 mathematics
Real line
Mathematics
Conjecture
Mathematics - Complex Variables
Heat equation
Applied Mathematics
010102 general mathematics
Mathematical analysis
Changements de signe
010101 applied mathematics
Fourier transform
Real-valued function
Mathematics - Classical Analysis and ODEs
symbols
Entire functions
Sign (mathematics)
Subjects
Details
- Language :
- English
- Database :
- OpenAIRE
- Accession number :
- edsair.doi.dedup.....5a8387d905ec883ca4cd842b263cbc1f