Get 20M+ Full-Text Papers For Less Than $1.50/day. Start a 14-Day Trial for You or Your Team.

Learn More →

Determination of jumps for functions via derivative Gabor series

Determination of jumps for functions via derivative Gabor series Recently, Shi Xianliang and Hu Lan published the method of concentration factors for determination of jumps of functions via MCM conjugate wavelets. Usually, it is difficult to calculate the Hilbert transform of general window functions. The aim of this paper is to discuss determination of jumps for functions based on derivative Gabor series. The results will simplify the calculation of jump values. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Applied Mathematics-A Journal of Chinese Universities Springer Journals

Determination of jumps for functions via derivative Gabor series

Download PDF
9 pages

Loading next page...
 
/lp/springer-journals/determination-of-jumps-for-functions-via-derivative-gabor-series-jyA4CeKtcA
Publisher
Springer Journals
Copyright
Copyright © 2009 by Editorial Committee of Applied Mathematics-A Journal of Chinese Universities and Springer-Verlag GmbH
Subject
Mathematics; Applications of Mathematics; Mathematics, general
ISSN
1005-1031
eISSN
1993-0445
DOI
10.1007/s11766-009-2181-5
Publisher site
See Article on Publisher Site

Abstract

Recently, Shi Xianliang and Hu Lan published the method of concentration factors for determination of jumps of functions via MCM conjugate wavelets. Usually, it is difficult to calculate the Hilbert transform of general window functions. The aim of this paper is to discuss determination of jumps for functions based on derivative Gabor series. The results will simplify the calculation of jump values.

Journal

Applied Mathematics-A Journal of Chinese UniversitiesSpringer Journals

Published: Jun 10, 2009

References

  • Detection of edges in spectral data
    Gelb, A.; Tadmor, E.
  • Determination of jumps in terms of spectral data
    Shi, Q. L.; Shi, X. L.
  • Determination of jumps via advanced concentration factors
    Shi, X. L.; Zhang, H. Y.
  • Recovery of edges from spectral data with noise—a new perspective
    Engelberg, S.; Tadmor, E.
  • Adaptive filters for piecewise smooth spectral data
    Tadmor, E.; Tanner, J.
  • Optimal filter and modifier for piecewise smooth spectral data
    Tanner, J.
  • Detection of edges from spectral data: New results
    Wei, M.; Martinez, A. G.; Pierro, A. R.
  • Concentration factors for functions with harmonic bounded mean variation
    Hu, L.; Shi, X. L.
  • An Introduction to Frames and Riesz Bases
    Christensen, O.
  • Gabor Analysis and Algorithms
    Janssen, A. J. E. M.
  • Trigonometric Series
    Zygmund, A.
  • über die Bestimmung des Sprunges einer Function aus ihre Fouriereihe
    Fejer, L.
  • Determination of jump of a function of bounded p-variation by its Fourier series
    Golubov, B. I.
  • Determination of jumps of a bounded function by its Fourier series
    Kvernadge, G.
  • On convergence of functions of generalized bounded variation
    Waterman, D.
  • On Λ BMV functions with applications to the theory of Fourier series
    Shi, X. L.