Multichannel Blind Deconvolution of the Arterial Pressure using Ito Calculus Method

Authors

  • Waheed MEL Department of Computer Science, Faculty of Computer & Information, Suez Canal University, Egypt
  • M.Elshewey A Department of Computer Science, Faculty of Computer & Information, Suez Canal University, Egypt

Keywords:

FInite Impulse Response (FIR), Multichannel Blind Deconvolution (MBD), Stochastic Calculus (SC)

Abstract

Multichannel Blind Deconvolution (MBD) is a powerful tool particularly for the identification and estimation of dynamical systems in which a sensor, for measuring the input, is difficult to place. This paper presents Ito calculus method for the estimation of the known time-varying coefficients. The arterial network is modeled as a Finite Impulse Response (FIR) filter with unknown  coefficients. A new tool for estimation of both the central arterial pressure and the unknown channel dynamics has been developed. The convolution process is modeled as a Finite Impulse Response (FIR) filter with unknown  coefficients. The source signal is also unknown. Assuming that one of the FIR filter coefficients are time varying, we have been able to get accurate estimation results for the source signal, even through the filter order is unknown. The time varying filter coefficients have been estimated through the SC algorithm, and we have been able to deconvolve the measurements and obtain both the source signal and the convolution path. The positive results demonstrate that the SC approach is superior to conventional methods.

References

. A. Abutaleb & M.Papaioannou, "Introduction to the stochastic calculus & the Malliavin calculus with applications in engineering & finance", IDEA Group, New York, NY, USA, 2010.

. A. Abutaleb, "Instantaneous frequency estimation using stochastic calculus & bootstrapping", EURASIP Journal on Applied Signal Processing, Vol.12, pp 1-16, 2005.

. A. Abutaleb, M. El-sayed Waheed & Nermeen M. Elhamy, "Multi-channel blind Deconvolution using the stochastic Calculus for estimation of the central arterial pressure", Mathematical problems in Engineering, Vol. 2010, Article ID 602373, 21 Pages, 2010.

. A. Abutaleb & M. Papaioannou,"Malliavin calculus for the estimation of time-varying regression models used in finance Application", International Journal of Theoretical & Applied Finance, Vol. 10, no. 5, pp. 771-800, 2007.

. D.Ocone & I. Karatzas,"A generalized Clark representation formula, with application to optimal portfolios", Stochastics & Stochastics Reports, Vol. 34, pp. 187-220, 1991.

. M. Li," Fractal time series-a tutorial review", Mathematical Problems in Engineering vol. 2010, Artical ID 157264, 26 Pages, 2010.

. C. Cattani,"Fractals and hidden Symmetries in DNA", Mathematical Problems in engineering vol. 2010, Article ID 507056, 31 Pages, 2010.

. B.Hafidi and A.Mkhadri," A corrected Akaike criterion based on Kullback's symmetric divergence: application in time series, multiple and multivariate regression,"Computational Statics and Data Analytics, vol. 50 no. 6, pp. 1524-1550, 2006.

. J.O. Hahn, AT Reisner, and H.H. Asada,"Modeling and 2-sensor blind identification of human cardiovascular system,"Control Engineering Practice, Vol. 17, no. 11, pp. 1318-1328, 2009.

. B.Oksendal, Stochastic Differential Equations: An Introduction with Applications, Universitext, Springer, New York, NY, USA, 1998.

. P.Jackel, Monte Carlo Simulation Methods in Finance, John Wiley & Sons, New York, NY, USA, 2003.

. G. Swamy, Q.Ling, T. Li, and R. Mukkamala,"Blind identification of the aortic pressure waveform from multiple peripheral artery pressure waveforms,"Americal Journal of Physiology, vol. 292, no. 5, pp. H2257-H2264, 2007.

. D.T. Pham and J.F. Cardoso,"Blind Separation of instantaneous mixtures of nonstationary sources," IEEE Transactions on Signal Processing, vol. 49, no. 9, pp. 1837-1848, 2001.

. IEEE Proceedings, special issue on Blind Separation of Signals, October 1998.

. S.Dégerine and E. Kane,"A comparative study of approximate joint diagonalization algorithms for blind source separation in presence of additive noise," IEEE Transaction on signal processing, vol. , no.6, pp. 3022-3031. 2007.

. P.Kloeden and E. Platen, Numerical solution of Stochastic Differential Equations, Springer, New York, NY, USA 1999.

. D.B>. McCombie, A.T. Reisner, and HH Asada,"Laguerre-Model blind system identificatio: Cardiovascular dynamics estimated from multiple peripheral circulatory signal," IEEE Transactions on Biomedical Engineering, Vol. 52, no. 11, pp. 1889-1901, 2005.

Downloads

Published

2024-02-26

How to Cite

Waheed, M. E.-S., & M.Elshewey, A. (2024). Multichannel Blind Deconvolution of the Arterial Pressure using Ito Calculus Method. COMPUSOFT: An International Journal of Advanced Computer Technology, 4(10), 1989–2000. Retrieved from https://ijact.in/index.php/j/article/view/349

Issue

Section

Original Research Article

Similar Articles

<< < 1 2 3 > >> 

You may also start an advanced similarity search for this article.