Quantification of heart rate variability by discrete nonstationary non-Markov stochastic processes

Yulmetyev, Renat M.; Hänggi, Peter; Gafarov, Fail

doi:10.1103/physreve.65.046107

Cited by 51 publications

(91 citation statements)

References 40 publications

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“…Considerable effort has gone into methods based on the assumption that, in view of the complexity of the activity of the autonomous nervous system, at least a major part of the variability of the heart rate may treated as a noise 4 driven process [6,7,8]. Most of these methods use fractal or multifractal scaling analysis [9]. The approach has also yielded stochastic models of heart rate variability [10,11].…”

Section: Introductionmentioning

confidence: 99%

How random is your heart beat?

Urbanowicz¹,

Żebrowski²,

Baranowski³

et al. 2007

Physica A: Statistical Mechanics and its Applications

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Abstract:We measure the content of random uncorrelated noise in heart rate variability using a general method of noise level estimation using a coarse grained entropy. We show that usually -except for atrial fibrillation -the level of such noise is within 5 -15% of the variance of the data and that the variability due to the linearly correlated processes is dominant in all cases analysed but atrial fibrillation. The nonlinear deterministic content of heart rate variability remains significant and may not be ignored.

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Section: Introductionmentioning

confidence: 99%

How random is your heart beat?

Urbanowicz¹,

Żebrowski²,

Baranowski³

et al. 2007

Physica A: Statistical Mechanics and its Applications

View full text Add to dashboard Cite

show abstract

“…It was shown in Refs. [2,10,11] that the finite-difference kinetic equation of a nonMarkov type for TCF M 0 ðtÞ can be written by means of the technique of projection operators of Zwanzig'-Mori's type [14,15] …”

Section: Macroscopic Description In the Analysis Of Stochastic Processesmentioning

confidence: 99%

“…We have taken the interval of 40 points as the starting point and have calculated all the noise low-order parameters l i ði ¼ 1; 2; 3Þ and L j ðj ¼ 1; 2Þ by Eqs. (9) and (10). Then the interval was consistently increased by unit time segment t and the relaxation parameters l i , L j were calculated every time at the increase of the interval.…”

Section: Local Noisy Parametersmentioning

confidence: 99%

“…(9) and (10). Then the operation of ''stepwise shift to the right'' at the interval of the fixed length M is executed, and parameters are computed again.…”

Section: Article In Pressmentioning

confidence: 99%

“…We start with a macroscopic approach based on the kinetic theory of discrete stochastic processes and the hierarchy of the chain of finite-difference kinetic equations for the discrete time correlation function (TCF) and memory functions [2,10,11].…”

Section: Introductionmentioning

confidence: 99%

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Universal approach to overcoming nonstationarity, unsteadiness and non-Markovity of stochastic processes in complex systems

Yulmetyev¹,

Мокшин²,

Hänggi

2005

Physica A: Statistical Mechanics and its Applications

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In the present paper, we suggest a new universal approach to study complex systems by microscopic, mesoscopic and macroscopic methods. We discuss new possibilities of extracting information on nonstationarity, unsteadiness and non-Markovity of discrete stochastic processes in complex systems. We consider statistical properties of the fast, intermediate and slow components of the investigated processes in complex systems within the framework of microscopic, mesoscopic and macroscopic approaches separately. Among them theoretical analysis is carried out by means of local noisy time-dependent parameters and the conception of a quasi-Brownian particle (QBP) (mesoscopic approach) as well as the use of wavelet transformation of the initial row time series. As a concrete example we examine the seismic time series data for strong and weak earthquakes in Turkey (1998; 1999) in detail, as well as technogenic explosions. We propose a new possible solution to the problem of forecasting strong earthquakes. Besides we have found out that an unexpected restoration of the first two local noisy parameters in weak earthquakes and technogenic explosions is determined by exponential law. In this paper we have also carried out the comparison and ARTICLE IN PRESS have discussed the received time dependence of the local parameters for various seismic phenomena. r

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Manifestation of Chaos in Real Complex Systems: Case of Parkinson’s Disease

Yulmetyev¹,

Demin²,

Hänggi

Understanding Complex Systems

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In this chapter we present a new approach to the study of manifestations of chaos in real complex system. Recently we have achieved the following result. In real complex systems the informational measure of chaotic chatacter (IMC) can serve as a reliable quantitative estimation of the state of a complex system and help to estimate the deviation of this state from its normal condition. As the IMC we suggest the statistical spectrum of the non-Markovity parameter (NMP) and its frequency behavior. Our preliminary studies of real complex systems in cardiology, neurophysiology and seismology have shown that the NMP has diverse frequency dependence. It testifies to the competition between Markovian and non-Markovian, random and regular processes and makes a crossover from one relaxation scenario to the other possible. On this basis we can formulate the new concept in the study of the manifestation of chaoticity. We suggest the statistical theory of discrete non-Markov stochastic processes to calculate the NMP and the quantitative evaluation of the IMC in real complex systems. With the help of the IMC we have found out the evident manifestation of chaosity in a normal (healthy) state of the studied system, its sharp reduction in the period of crises, catastrophes and various human diseases. It means that one can appreciably improve the state of a patient (of any system) by increasing the IMC of the studied live system. The given observation creates a reliable basis for predicting crises and catastrophes, as well as for diagnosing and treating various human diseases, Parkinson's disease in particular.

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Quantification of heart rate variability by discrete nonstationary non-Markov stochastic processes

Cited by 51 publications

References 40 publications

How random is your heart beat?

How random is your heart beat?

Universal approach to overcoming nonstationarity, unsteadiness and non-Markovity of stochastic processes in complex systems

Manifestation of Chaos in Real Complex Systems: Case of Parkinson’s Disease

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