Fbsp wavelet

In applied mathematics, fbsp wavelets are frequency B-spline wavelets.

fbsp m-fb-fc

These frequency B-spline wavelets are complex wavelets whose spectrum are spline.

fbsp^{(\operatorname {m-fb-fc} )}(t):={\sqrt {fb}}.\operatorname {sinc} ^{m}\left({\frac {t}{fb^{m}}}\right).e^{j2\pi fct}

where sinc function that appears in Shannon sampling theorem.

Clearly, Shannon wavelet (sinc wavelet) is a particular case of fbsp.

Frequency B-spline wavelets: cubic spline fbsp 3-1-2 complex wavelet.

References[]

S.G. Mallat, A Wavelet Tour of Signal Processing, Academic Press, 1999, ISBN 0-12-466606-X
C.S. Burrus, R.A. Gopinath, H. Guo, Introduction to Wavelets and Wavelet Transforms: A Primer, Prentice-Hall, 1988, ISBN 0-13-489600-9.
O. Cho, M-J. Lai, A Class of Compactly Supported Orthonormal B-Spline Wavelets in: Splines and Wavelets, Athens 2005, G Chen and M-J Lai Editors pp. 123–151.
M. Unser, Ten Good Reasons for Using Spline Wavelets, Proc. SPIE, Vol.3169, Wavelets Applications in Signal and Image Processing, 1997, pp. 422–431.

S.G. Mallat, A Wavelet Tour of Signal Processing, Academic Press, 1999, ISBN 0-12-466606-X
C.S. Burrus, R.A. Gopinath, H. Guo, Introduction to Wavelets and Wavelet Transforms: A Primer, Prentice–Hall, 1988, ISBN 0-13-489600-9.
O. Cho, M-J. Lai, A Class of Compactly Supported Orthonormal B-Spline Wavelets in: Splines and Wavelets, Athens 2005, G Chen and M-J Lai Editors pp. 123–151.
M. Unser, Ten Good Reasons for Using Spline Wavelets, Proc. SPIE, Vol.3169, Wavelets Applications in Signal and Image Processing, 1997, pp. 422–431.

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