1. Wavelet expansions and asymptotic behavior of distributions
- Author
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Saneva, Katerina and Vindas, Jasson
- Subjects
- *
WAVELETS (Mathematics) , *TAUBERIAN theorems , *TIME-frequency analysis , *POLYNOMIALS , *STOCHASTIC convergence , *SCHWARTZ distributions , *ASYMPTOTIC expansions - Abstract
Abstract: We develop a distribution wavelet expansion theory for the space of highly time-frequency localized test functions over the real line and its dual space , namely, the quotient of the space of tempered distributions modulo polynomials. We prove that the wavelet expansions of tempered distributions converge in . A characterization of boundedness and convergence in is obtained in terms of wavelet coefficients. Our results are then applied to study local and non-local asymptotic properties of Schwartz distributions via wavelet expansions. We provide Abelian and Tauberian type results relating the asymptotic behavior of tempered distributions with the asymptotics of wavelet coefficients. [Copyright &y& Elsevier]
- Published
- 2010
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