oalogo2  

AUTHOR(S):
Andris Buikis, Alberts Aldersons

 

 

TITLE

Time Registration and Life Science Data Registration

pdf PDF

 

ABSTRACT

The paper is destined for use in medicine, psychology, in man’s self-development training, breathing technique’s training, in the field of stress resistance, health promotion, strengthening of the capacity for work. We involve new technology for registration of time interval between two consecutive EKG RR intervals (R peaks) or pulse wave peaks, which consist of simultaneous registration of two time intervals: 1) the time between two consecutive R peaks, and 2) time interval from the beginning of registration and beginning of each wholesome R or pulsogram peak. Our new mathematical algorithm allows reconstructing all pulsogram or RR intervalogram, providing full use of time domain and also frequency domain methods.

 

KEYWORDS

Heart rate variability, RR interval, time interval, cubic spline, spline approximation, empty intervals

 

REFERENCES

[1] Aldersons A., Buikis A. Mathematical algorithm for heart rate variability analysis. Recent Advances in Applied &Biomedical Informatics and Computational Engineering in Systems Applications, 2011, p. 381-386.

[2] Buikis A., Aldersons A. Training method for promotion of emotional stress reduction, psychological coherence and vegetative balance. Latvian patent No. 13729, 2008. Riga, p. 14.

[3] Buikis A., Aldersons A. In depth mathematical algorithm for heart rate variability analysis. Journal of Multidisciplinary Engineering Science Studies, 2017. Vol. 3, Issue 1. p. 1262-1269.

[4] Aldersons A., Strautina M. Respiratory sinus arrhythmia biofeedback in diaphragm breathing training. Proceedings of the Latvian Academy of Sciences. Section B: Natural, Exact and Applied Sciences, 1998, Vol. 52, No. 3/4, p. 194-199.

[5] Heart rate variability. Standards of measurement, psychological interpretation, and clinical use. Task force of the European Society of Cardiology the North American Society of Pacing Electrophysiology. Circulation 93: pp.1043-1065, 1996.

[6] Mika P. Tarvainen „Kubios HRV version 2.2“. USER’S GUIDE, 2014. University of Eastern Finland. p. 44.

[7] Parin V.V., Baevskij P. M., Volkov Y. N., Gazenko O. G. Cosmic cardiology. [Парин В.В., Баевский P.M., Волков Ю.Н., Газенко О.Г. Космическая кардиология.] Leningrad. (in Russian) Медицина, 1967.

[8] Zhemaitite D.I. Vegetative regulation sinus rhythm for the healthy and patient. Analysis the heart rhythm. Vilnius, 1982. p. 22-32.

[9] Iljina S.S., Chernajev A.S., Jefimova I.P., Umanskaja N.E., Zapara V.V. Impact different methods for the analysis heart rate variability in the cardiology. Vestnik OGU, 2003. .No. 5. p. 115-120.

[10]Pierzcholski M., Stepien R.A., Stepien P. New nonlinear methods of heart rate variability and diagnostics of artrial fibrillation. International Journal of Andris Buiks, Alberts Aldersons Biology and Biomedicine, 2011. Issue 4, Vol. 5. p. 201-208.

[11]Smith A.L., Owen H., Reynold K.J. Heart rate variable indices for very short-term (30 beat) analysis. Part 1: survey and toolbox. Journal Clinic Monitor Computer, 2013. 27(5). p. 569-576.

[12]ABDEL-Rahman Al-Qawasmi and Khaled Daqrouq. ECG signal enhancement using wavelet transform. WSEAS TRANSACTIONS on BIOOGY and BIOMEDICINE. Vol. 7, Issue2, April 2010. P. 62-70.

[13]Wiener N. Cybernetics or control and communication in the animal and machine. Second edition. The M.I.T. Press. Cambridge, Massachusetts. 1985.

[14]Ahlberg J.H., Nilson E.N., Walsh J.L. The Theory of Splines and Their Applications. Academic Press, 1967.

[15]Buike, M., Buikis, A. Representation formula for cubic spline with explicit dependence of interpolation function values. Acta Universitatis Latviensis, 1992, 575. p. 43-46. (In Russian language)

[16]Buikis A., Buike M. The Conservative Averaging Method: applications, theory and new hyperbolic approximation. Mathematical and Computational Methods in Applied Sciences. Proceedings of the 3rd International Conference on Applied, Numerical and Computational Mathematics. Sliema, Malta, August 17-19, 2015. p. 58-67

[17]Quarteroni A., Valli A. Numerical Approximation of partial differential equations. Springer, 2008. Berlin Heidelberg.

[18]Samarskii A.A. The theory of differential schemes. Marcel Dekker, Inc. New York, Base, 2001. [19]Wikipedia. Bezier curve.

Cite this paper

Andris Buikis, Alberts Aldersons. (2017) Time Registration and Life Science Data Registration. International Journal of Biology and Biomedicine, 2, 36-41

 

cc.png
Copyright © 2017 Author(s) retain the copyright of this article.
This article is published under the terms of the Creative Commons Attribution License 4.0