A theory of symbolic dynamic systems with long-range correlations based on the consideration of the binary N-step Markov chains developed earlier in Phys. Rev. Lett. 90, 110601 (2003) is generalized to the biased case (non equal numbers of zeros and unities in the chain). In the model, the conditional probability that the i-th symbol in the chain equals zero (or unity) is a linear function of the number of unities (zeros) among the preceding N symbols. The correlation and distribution functions as well as the variance of number of symbols in the words of arbitrary length L are obtained analytically and verified by numerical simulations. A self-similarity of the studied stochastic process is revealed and the similarity group transformation o...
In the face of the upcoming 30th anniversary of econophysics, we review our contributions and other ...
This monograph is a gateway for researchers and graduate students to explore the profound, yet subtl...
We developed a new formulation and derived a set of equations for two-time correlation functions in ...
A theory of systems with long-range correlations based on the consideration of binary N-step Markov ...
A new approach to describing correlation properties of complex dynamic systems with long-range memor...
A theory of additive Markov chains with long-range memory, proposed earlier in Phys. Rev. E 68, 0611...
A new object of the probability theory, two-sided chain of events (symbols), is introduced. A theory...
We address this work to investigate symbolic sequences with long-range correlations by using computa...
In this paper we present the concept of description of random processes in complex systems with disc...
Two approaches to studying the correlation functions of the binary Markov sequences are considered. ...
In this paper we give explicit examples of long-range correlated stationary Markovian processes y(t)...
We introduce a general method for the study of memory in symbolic sequences based on higher-order Ma...
An information-theoretic approach to numerically determine the Markov order of discrete stochastic p...
A finite-state Markov chain M can be regarded as a linear transform operating on the set of probabil...
In this paper the determination of the 1-th and 2-th order correlation functions of chaotic sequence...
In the face of the upcoming 30th anniversary of econophysics, we review our contributions and other ...
This monograph is a gateway for researchers and graduate students to explore the profound, yet subtl...
We developed a new formulation and derived a set of equations for two-time correlation functions in ...
A theory of systems with long-range correlations based on the consideration of binary N-step Markov ...
A new approach to describing correlation properties of complex dynamic systems with long-range memor...
A theory of additive Markov chains with long-range memory, proposed earlier in Phys. Rev. E 68, 0611...
A new object of the probability theory, two-sided chain of events (symbols), is introduced. A theory...
We address this work to investigate symbolic sequences with long-range correlations by using computa...
In this paper we present the concept of description of random processes in complex systems with disc...
Two approaches to studying the correlation functions of the binary Markov sequences are considered. ...
In this paper we give explicit examples of long-range correlated stationary Markovian processes y(t)...
We introduce a general method for the study of memory in symbolic sequences based on higher-order Ma...
An information-theoretic approach to numerically determine the Markov order of discrete stochastic p...
A finite-state Markov chain M can be regarded as a linear transform operating on the set of probabil...
In this paper the determination of the 1-th and 2-th order correlation functions of chaotic sequence...
In the face of the upcoming 30th anniversary of econophysics, we review our contributions and other ...
This monograph is a gateway for researchers and graduate students to explore the profound, yet subtl...
We developed a new formulation and derived a set of equations for two-time correlation functions in ...