Abstract
Given a distribution f belonging the Sobolev space H1/2, we show that partial sums of its wavelet expansion behave like truncated versions of the inverse Fourier transform of f. Our result is sharp in the sense that such behavior no longer happens in general for Hs if s<1/2. © 2000 Academic Press.
Cite
CITATION STYLE
APA
Reyes, N. N. (2000). Behavior of Partial Sums of Wavelet Series. Journal of Approximation Theory, 103(1), 55–60. https://doi.org/10.1006/jath.1999.3410
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