Comparativo de los Algoritmos de Dimensión Fractal Higuchi, Katz y Multiresolución de Conteo de Cajas en Señales EEG Basadas en Potenciales Relacionados por Eventos

Comparativo de los Algoritmos de Dimensión Fractal Higuchi, Katz y Multiresolución de Conteo de Cajas en Señales EEG Basadas en Potenciales Relacionados por Eventos

Published 2017-09-12

Open | Download
PDF (Spanish) FLIP
Issue
Vol. 14 No. 27 (2017)
Section
Articles
How to Cite
Comparativo de los Algoritmos de Dimensión Fractal Higuchi, Katz y Multiresolución de Conteo de Cajas en Señales EEG Basadas en Potenciales Relacionados por Eventos. (2017). Revista EIA, 14(27), 73-83. https://doi.org/10.24050/reia.v14i27.864
DOI

https://doi.org/10.24050/reia.v14i27.864
Dimensions
PlumX
Citations
Crossref
Citations in Crossref
Scopus
Citations in Scopus
Google Scholar
Europe PMC
Citations in Europe PMC
license

Copyright statement

The authors exclusively assign to the Universidad EIA, with the power to assign to third parties, all the exploitation rights that derive from the works that are accepted for publication in the Revista EIA, as well as in any product derived from it and, in in particular, those of reproduction, distribution, public communication (including interactive making available) and transformation (including adaptation, modification and, where appropriate, translation), for all types of exploitation (by way of example and not limitation : in paper, electronic, online, computer or audiovisual format, as well as in any other format, even for promotional or advertising purposes and / or for the production of derivative products), for a worldwide territorial scope and for the entire duration of the rights provided for in the current published text of the Intellectual Property Law. This assignment will be made by the authors without the right to any type of remuneration or compensation.

Consequently, the author may not publish or disseminate the works that are selected for publication in the Revista EIA, neither totally nor partially, nor authorize their publication to third parties, without the prior express authorization, requested and granted in writing, from the Univeridad EIA.

SANTIAGO FERNANDEZ FRAGA
INSTITUTO TECNOLOGICO DE QUERETARO
Perfil Google Scholar
JAIME RANGEL MONDRAGON
UNIVERSIDAD AUTONOMA DE QUERETARO
Perfil Google Scholar
Show authors biography

SANTIAGO FERNANDEZ FRAGA,

Departamento de Sistemas y Computción

Profesor de tiempo completo

area inteligencia artificial

JAIME RANGEL MONDRAGON,

Facultad de Informatica

Deparamento de Algoritmos y Redes

La obtención de información por medio de la medición de señales registradas durante diferentes procesos o condiciones fisiológicas del cerebro es importante para poder desarrollar interfaces computacionales que traduzcan las señales eléctricas cerebrales a comandos computacionales de control. Un electroencefalograma (EEG) registra la actividad eléctrica del cerebro en respuesta al recibir diferentes estímulos externos (potenciales por eventos). El análisis de estas señales permite identificar y distinguir estados específicos de la función fisiológica del cerebro. La Dimensión Fractal se ha utilizado como una herramienta para el análisis de formas de ondas biomédicas, en particular se ha utilizado para determinar la medida de la complejidad en series de tiempo generadas por EEG. El presente documento pretende analizar series de tiempo biomédicas obtenidas por EEG a las cuales se obtendrán la FD por medio de los métodos Higuchi, Katz y Multi-resolución de Conteo de Cajas, que muestre la relación entre el método para la obtención de la Dimensión Fractal y la condición fisiológica de la señal basada en Potenciales Cerebrales Relacionados por Eventos

Article visits 820 | PDF visits 326

Downloads

Download data is not yet available.
  1. M. Bachmann, J. Lass, A. Suhhova and H. Hinrikus, (2013). Spectral asymmetry and Higuchi´s Fractal Dimension Measures of Depression Electrencephalogram, Computational and Mathematical Methods in Medicine, Hindawi Publishing Corporation, vol. 2013, 8 pages.
  2. P. N. Baljekar and H. A. Patil, (2012). A comparison of waveform fractal dimension techniques for voice pathology classification, IEEE ICASPP ISSN 978-1-4673-0046-9, pp. 4461-4464
  3. T. Bojić, A. Vuckovic, A. Kalauzi, (2010). Modeling EEG fractal dimension changes in wake and drowsy states in humans—a preliminary study, Journal of Theoretical Biology, 262, pp. 214-222.
  4. A. Bashashati, R.K. Ward, G.E. Birch, M.R. Hashemi, MA. Khalilzadeh, (2003). Fractal Dimension-Based EEG Biofeedback System, Proceedings of the 25th Annual International Conference of the IEEE EMBS, pp. 2220-2223, 2003.
  5. F. Cervantes-De la Torre, J.I. González-Trejo, C.A. Real-Ramirez and L.F. Hoyos-Reyes,(2013). Fractal dimension algorithms and their application to time series associated with natural phenomena, 4th National Meeting in Chaos, Comlex Sustem and Time Series, Journal o Physics: Conference Series, 475, 10 pages.
  6. A. Delorme and S. Makeig, (2004). EEGLAB: an open source toolbox for analysis of single-trial EEG dynamics. Journal of Neuroscience Methods, 134:9-21.
  7. Dubravka R. Jevtić, and Milorad P. Paskaš, (2011). Application of Katz Algorithm for Fractal Dimension in Analysis of Room Impulse Response, 19th Telecommunications forum TELFOR 2011, pp. 1063-1066.
  8. D. Easwaramoorthy and R. Uthayakumar, (2010). Analysis of EEG Signals using Advanced Generalized Fractal Dimensions, Second International conference on Computing, Communication and Networking Technologies, 978-1-4244-6589-7, 6 pages.
  9. R. Esteller, G. Vachtsevanos, J. Echauz, and B. Litt, (2001). A Comparison of Waveform Fractal Dimension Algorithms, IEEE Transactions on Circuits and Systems-I: fundamental theory and applications, vol. 48, no. 2, pp. 177-183, 2001.
  10. G. Gálvez Coyt, A. Muñoz Diosdado, J. A. Balderas López, J. L. del Rio Correa, and F. Angulo Brown, (2013). Higuchi’s Method applied to the detection of periodic components in time series and its application to seismograms, COMPLEX SYSTEMS Revista Méxicana de Física, S 59 (1), pp. 1-6.
  11. S. Georgiev, Z. Minchev, C. Christova, D. Philipova, (2009). EEG Fractal Dimension Measurement before and after Human Auditory Stimulation, Bioautomaton, pp. 70-81.
  12. B. P. Harne, (2014). Higuchi Fractal Dimension Analysis of EEG Signal before and after OM Chanting to Observe Overall Effect on Brain, International Journal of Electrical and Computer Engineering (IJECE), vol. 4 pp. 585-592.
  13. HeadIT, Swartz Center for Computational Neuroscience (SCCN) of the University of California, San Diego. Its development has been funded by U.S. National Institutes of Health grants R01-MH084819 (Makeig, Grethe PIs) and R01-NS047293 (Makeig PI).
  14. M. Katz, (1988). Fractals and the analysis of waveforms, Computers in Biology and Medicine, vol. 18, pp. 145-156.
  15. T. Q. D. Khoa, V. Q. Ha and V. V. Toi, (2012). Higuchi Fractal Properties of Onset Epilepsy Electroencephalogram, Computational and Mathematical Methods in Medicine, Hindawi Publishing Corporation, vol. 2012, 6 pages.
  16. C. K. Loo, A. Samraj and G. C. Lee, (2011). Evaluation of Methods for Estimating Fractal Dimension in Motor Imagery-Based Brain Computer Interface, Hindawi Publishing Corporation, Discrete Dynamics in Nature and Society Vol. 2011, Article ID 724697, 8 pages.
  17. W. Lutzenberger, H. Preissl, F. Pulvermüller, (1995). Fractal dimension of electroencephalographic time series and underlying brain processes, Biological Cybernetics Springer-Verlag, vol. 73, pp. 477-482.
  18. S. Makeig, A. Delorme, M. Westerfield, T-P. Jung, J. Townsend, E. Courchesne and T. J. Sejnowski, (2004). Electroencephalographic brain dynamics following visual targets requiring manual responses, Public Library of Science Biology, 29 pages.
  19. S. Makeig, M. Westerfield, T-P Jung, J. Covington, J. Townsend,T. J. Sejnowski, and E. Courchesne, (1999). Functionally Independent Components of the Late Positive Event-Related Potential during Visual Spatial Attention, The Journal of Neuroscience, 19 (7), pp. 2665-2680.
  20. A. S. Martins, L. A. Neves, M. Z. Nascimento, M. F. Godoy, E. L. Flores and G. A. Carrijo, (2012). Multiscale Fractal Descriptors and Polynomial Classifier for Partial Pixels Identification in Regions of Interest of Mammographic Images, IEEE Latin America Transactions, Vol. 10, No. 4, pp. 1999-2005.
  21. G. Millán, E. S. Juan and M. Jamett, (2014). Simple Estimator of the Hurst Exponent for Self-Similar Traffic Flows, IEEE Latin America Transactions, Vol. 12, No. 8, pp. 1341-1346.
  22. Müller K.R., and Mattia D. (2010). Combining Brain-Computer Interfaces and Assistive Technologies: State-of-the-Art and Challenges. Frontiers in Neuroscience, Vol 4, pp.161.
  23. H. H. Mueller, (2010) “QEEG Brain Mapping, Evaluating the rhythms of the Brain”, Edmonton Neurotherapy, 2010, On line
  24. http://www.edmontonneurotherapy.com/Edmonton_Neurotherapy_QEEG_brain_mapping.html.
  25. P. Paramanathan, R. Uthayakumar, (2008), Application of fractal theory in analysis of human electroencephalographic signals, Computers in Biology and Medicine, no. 38, pp. 372-378
  26. P. Paramanathan and R. Uthayakumar, (2007). Detecting Patterns in Irregular Time Series with Fractal Dimension, International Conference on Computational Intelligence and Multimedia Applications, pp. 323-327.
  27. F. R. Perlingeiro, L. L. Ling, (2005). Uma Nova Abordagem para Estimação da
  28. Banda Efetiva em Processos Fractais. IEEE Latin America Transactions, Vol. 3, No. 5, pp. 436-446.
  29. G. E. Polychronaki, P. Y. Ktonas, S. Gatzonis, A Siatouni, P. A. Asvestas, H. Tsekou, D. Sakas and K. S. Nikita, (2010). Comparison of fractal dimension estimation algorithms for epileptic seizure onset detection, Journal of Neural Engineering, 046007, 18 pages.
  30. B. S. Raghavendra, and D. N. Dutt, (2010). Computing Fractal Dimension of Signals using Multiresolution Box-counting Method, International Journal of Information and Mathematical Sciences, 6:1, pp. 50-65.
  31. B. S. Raghavendra and D. N. Dutt, (2009). A note on fractal dimensions of biomedical waveforms, Computers in Biology and Medicine, 39, pp. 1006-1012.
  32. S. Spasić, Lj. Nikolić, D. Mutavdžić, J. Šaponjić, (2011). Independent complexity patterns in single neuron activity induced by static magnetic field, Computer Methods and Programs in Biomedicine, vol. 104, pp. 212-218.
  33. Sabogal S., Arenas G. (2011). Una Introducción a la geometría Fractal, Escuela de Matemáticas, Universidad Industrial de Santander. Bucaramanga, Cap I, pp. 2-15.

Information

Sistema OJS 3.4.0.7 - Metabiblioteca |