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Mathematical Problems in Engineering
Volume 2010, Article ID 428903, 13 pages
http://dx.doi.org/10.1155/2010/428903
Research Article

Dynamical Aspects of Macroscopic and Quantum Transitions due to Coherence Function and Time Series Events

1Department of Electrical and Computer Engineering, University of West Florida, 11000 University Parkway, Pensacola, FL 32514, USA
2Faculty of Applied Sciences, Politechnica University, Hagi-Ghita 81, 060032 Bucharest, Romania

Received 9 December 2009; Accepted 23 December 2009

Academic Editor: Ming Li

Copyright © 2010 Ezzat G. Bakhoum and Cristian Toma. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Linked References

  1. A. Toma and C. Morarescu, “Detection of short-step pulses using practical test-functions and resonance aspects,” Mathematical Problems in Engineering, vol. 2008, Article ID 543457, 15 pages, 2008. View at Publisher · View at Google Scholar · View at Zentralblatt MATH · View at Scopus
  2. B. Lazar, A. Sterian, St. Pusca, V. Paun, C. Toma, and C. Morarescu, “Simulating delayed pulses in organic materials,” Computational Science and Its Applications, vol. 3980, pp. 779–784, 2006. View at Publisher · View at Google Scholar · View at Scopus
  3. G. Toma and F. Doboga, “Vanishing waves on closed intervals and propagating short-range phenomena,” Mathematical Problems in Engineering, vol. 2008, Article ID 359481, 14 pages, 2008. View at Publisher · View at Google Scholar · View at Zentralblatt MATH · View at MathSciNet
  4. M. Li, “Fractal time series—a tutorial review,” Mathematical Problems in Engineering, vol. 2010, Article ID 157264, 26 pages, 2010. View at Publisher · View at Google Scholar · View at Zentralblatt MATH · View at MathSciNet
  5. M. Li and W. Zhao, “Representation of a stochastic traffic bound,” IEEE Transactions on Parallel and Distributed Systems, IEEE computer Society Digital Library, IEEE Computer Society, 2009, http://doi.ieeecomputersociety.org/10.1109/TPDS.2009.162.
  6. M. Li and S. C. Lim, “Modeling network traffic using generalized Cauchy process,” Physica A, vol. 387, no. 11, pp. 2584–2594, 2008. View at Publisher · View at Google Scholar · View at Scopus
  7. D. Griffiths, Introduction to Elementary Particles, John Wiley & Sons, New York, NY, USA, 1987.
  8. A. P. French and E. F. Taylor, An Introduction to Quantum Physics, Norton, New York, NY, USA, 1978.
  9. E. G. Bakhoum, “Fundamental disagreement of wave mechanics with relativity,” Physics Essays, vol. 15, no. 1, pp. 87–100, 2002. View at Publisher · View at Google Scholar · View at Scopus
  10. E. G. Bakhoum, “On the equation H=mv2 and the fine structure of the hydrogen atom,” Physics Essays, vol. 15, no. 4, pp. 439–443, 2002. View at Publisher · View at Google Scholar · View at Scopus
  11. E. G. Bakhoum, “Electrodynamics and the mass-energy equivalence principle,” Physics Essays, vol. 19, no. 3, pp. 305–313, 2006. View at Publisher · View at Google Scholar · View at Scopus
  12. C. Cattani, “Harmonic wavelets towards the solution of nonlinear PDE,” Computers & Mathematics with Applications, vol. 50, no. 8-9, pp. 1191–1210, 2005. View at Publisher · View at Google Scholar · View at Zentralblatt MATH · View at MathSciNet
  13. J. J. Rushchitsky, C. Cattani, and E. V. Terletskaya, “Wavelet analysis of the evolution of a solitary wave in a composite material,” International Applied Mechanics, vol. 40, no. 3, pp. 311–318, 2004. View at Publisher · View at Google Scholar
  14. C. Cattani, “Multiscale analysis of wave propagation in composite materials,” Mathematical Modelling and Analysis, vol. 8, no. 4, pp. 267–282, 2003. View at Google Scholar · View at Zentralblatt MATH · View at MathSciNet
  15. C. Cattani, “Harmonic wavelet analysis of a localized fractal,” International Journal of Engineering and Interdisciplinary Mathematics, vol. 1, no. 1, pp. 35–44, 2009. View at Google Scholar
  16. W.-S. Chen, “Galerkin-shannon of debye's wavelet method for numerical solutions to the natural integral equations,” International Journal of Engineering and Interdisciplinary Mathematics, vol. 1, no. 1, pp. 63–73, 2009. View at Google Scholar