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30 results on '"Contoyiannis, Y. F."'

1. Domain magnetization approach to the isothermal critical exponent

Author

Tsopelakou, A. -M., Margazoglou, G., Contoyiannis, Y. F., Kalozoumis, P. A., Diakonos, F. K., and Fytas, N. G.

Subjects
Condensed Matter - Statistical Mechanics
Abstract

We propose a method for calculating the isothermal critical exponent $\delta$ in Ising systems undergoing a second-order phase transition. It is based on the calculation of the mean magnetization time series within a small connected domain of a lattice after equilibrium is reached. At the pseudocritical point, the magnetization time series attains intermittent characteristics and the probability density for consecutive values of mean magnetization within a region around zero becomes a power law. Typically the size of this region is of the order of the standard deviation of the magnetization. The emerging power-law exponent is directly related to the isothermal critical exponent $\delta$ through a simple analytical expression. We employ this method to calculate with remarkable accuracy the exponent $\delta$ for the square-lattice Ising model where traditional approaches, like the constrained effective potential, typically fail to provide accurate results., Comment: 6 pages, 4 figures

Published
2016

2. The Earth as a living planet: human-type diseases in the earthquake preparation process

Author

Contoyiannis, Y. F., Potirakis, S. M., and Eftaxias, K.

Subjects
Physics - Geophysics
Abstract

The new field of complex systems supports the view that a number of systems arising from disciplines as diverse as physics, biology, engineering, and economics may have certain quantitative features that are intriguingly similar. The earth is a living planet where many complex systems run perfectly without stopping at all. The earthquake generation is a fundamental sign that the earth is a living planet. Recently, analyses have shown that human-brain-type disease appears during the earthquake generation process. Herein, we show that human-heart-type disease appears during the earthquake preparation of the earthquake process. The investigation is mainly attempted by means of critical phenomena, which have been proposed as the likely paradigm to explain the origins of both heart electric fluctuations and fracture induced electromagnetic fluctuations. We show that a time window of the damage evolution within the heterogeneous Earth's crust and the healthy heart's electrical action present the characteristic features of the critical point of a thermal second order phase transition. A dramatic breakdown of critical characteristics appears in the tail of the fracture process of heterogeneous system and the injury heart's electrical action. Analyses by means of Hurst exponent and wavelet decomposition further support the hypothesis that a dynamical analogy exists between the geological and biological systems under study.

Published
2012
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3. Critical features in electromagnetic anomalies detected prior to the L'Aquila earthquake

Author

Contoyiannis, Y. F., Nomicos, C., Kopanas, J., Antonopoulos, G., Contoyianni, L., and Eftaxias, K.

Subjects
Physics - Geophysics
Abstract

Electromagnetic (EM) emissions in a wide frequency spectrum ranging from kHz to MHz are produced by opening cracks, which can be considered as the so-called precursors of general fracture. We emphasize that the MHz radiation appears earlier than the kHz in both laboratory and geophysical scale. An important challenge in this field of research is to distinguish characteristic epochs in the evolution of precursory EM activity and identify them with the equivalent last stages in the earthquake (EQ) preparation process. Recently, we proposed the following two epochs/stages model: (i) The second epoch, which includes the finally emerged strong impulsive kHz EM emission is due to the fracture of the high strength large asperities that are distributed along the activated fault sustaining the system. (ii) The first epoch, which includes the initially emerged MHz EM radiation is thought to be due to the fracture of a highly heterogeneous system that surrounds the family of asperities. A catastrophic EQ of magnitude Mw = 6.3 occurred on 06/04/2009 in central Italy. The majority of the damage occurred in the city of L'Aquila. Clear kHz - MHz EM anomalies have been detected prior to the L'Aquila EQ. Herein, we investigate the seismogenic origin of the detected MHz anomaly. The analysis in terms of intermittent dynamics of critical fluctuations reveals that the candidate EM precursor: (i) can be described in analogy with a thermal continuous phase transition; (ii) has anti-persistent behaviour. These features suggest that the emerged candidate precursor could be triggered by microfractures in the highly disordered system that surrounded the backbone of asperities of the activated fault. We introduce a criterion for an underlying strong critical behavior., Comment: 8 pages, 6 figures

Published
2009
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4. Abrupt transition in a sandpile model

Author

Contoyiannis, Y. F. and Diakonos, F. K.

Subjects
Nonlinear Sciences - Adaptation and Self-Organizing Systems
Abstract

We present a fixed energy sandpile (FES) model which, by increasing the initial energy,undergoes, at the level of individual configurations, a discontinuous transition.The model is obtained by modifying the toppling procedure in the BTW rules: the energy transfer from a toppling site takes place only to neighbouring sites with less energy (negative gradient constraint) and with a time ordering (asynchronous). The model is minimal in the sense that removing either of the two above mentioned constraints (negative gradient or time ordering) the abrupt transition goes over to a continuous transition as in the usual BTW case. Therefore the proposed model offers an unique possibility to explore at the microscopic level the basic mechanisms underlying discontinuous transitions., Comment: 7 pages, 5 figures

Published
2006
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5. Critical QCD in Nuclear Collisions

Author

Antoniou, N. G., Contoyiannis, Y. F., Diakonos, F. K., and Mavromanolakis, G.

Subjects
High Energy Physics - Phenomenology
Abstract

A detailed study of correlated scalars, produced in collisions of nuclei and associated with the $\sigma$-field fluctuations, $(\delta \sigma)^2= < \sigma^2 >$, at the QCD critical point (critical fluctuations), is performed on the basis of a critical event generator (Critical Monte-Carlo) developed in our previous work. The aim of this analysis is to reveal suitable observables of critical QCD in the multiparticle environment of simulated events and select appropriate signatures of the critical point, associated with new and strong effects in nuclear collisions., Comment: 13 pages, 7 figures

Published
2005
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6. Prospects of detecting the QCD critical point

Author

Antoniou, N. G., Contoyiannis, Y. F., Diakonos, F. K., and Kapoyannis, A. S.

Subjects
High Energy Physics - Phenomenology
Abstract

We investigate the possibility to observe the QCD critical point in A+A collisions at the SPS. Guided by the QCD phase diagram expressed in experimentally accessible variables we suggest that the process C+C at 158 GeV/n freezes out very close to the critical point. We perform an analysis of the available preliminary experimental data for a variety of SPS processes. The basic tool in our efforts is the reconstruction of the critical isoscalar sector which is formed at the critical point. Our results strongly support our proposition regarding the C+C system., Comment: 4 figures

Published
2005

7. Observational Critical QCD

Author

Antoniou, N. G., Contoyiannis, Y. F., Diakonos, F. K., and Mavromanolakis, G.

Subjects
High Energy Physics - Phenomenology
Abstract

A detailed study of correlated scalars, produced in collisions of nuclei and associated with the $\sigma$-field fluctuations, $(\delta \sigma)^2= < \sigma^2 >$, at the QCD critical point (critical fluctuations), is performed on the basis of a critical event generator (Critical Monte-Carlo) developed in our previous work. The aim of this analysis is to reveal suitable observables of critical QCD in the multiparticle environment of simulated events and select appropriate signatures of the critical point, associated with new and strong effects in nuclear collisions., Comment: 5 pages, 5 figures, RevTeX

Published
2003

8. Pion production from a critical QCD phase

Author

Antoniou, N. G., Contoyiannis, Y. F., Diakonos, F. K., Karanikas, A. I., and Ktorides, C. N.

Subjects
High Energy Physics - Phenomenology
Abstract

A theoretical scheme which relates multiparticle states generated in ultrarelativistic nuclear collisions to a QCD phase transition is considered in the framework of the universality class provided by the 3-D Ising model. Two different evolution scenarios for the QGP system are examined. The statistical mechanics of the critical state is accounted for in terms of (critical) cluster formation consistent with suitably cast effective action functionals, one for each considered type of expansion. Fractal properties associated with these clusters, characterizing the density fluctuations near the QCD critical point, are determined. Monte-Carlo simulations are employed to generate events, pertaining to the total system, which correspond to signals associated with unconventional sources of pion production.

Published
2000
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9. The Fractal Geometry of Critical Systems

Author

Antoniou, N. G., Contoyiannis, Y. F., and Diakonos, F. K.

Subjects
High Energy Physics - Phenomenology
Abstract

We investigate the geometry of a critical system undergoing a second order thermal phase transition. Using a local description for the dynamics characterizing the system at the critical point T=Tc, we reveal the formation of clusters with fractal geometry, where the term cluster is used to describe regions with a nonvanishing value of the order parameter. We show that, treating the cluster as an open subsystem of the entire system, new instanton-like configurations dominate the statistical mechanics of the cluster. We study the dependence of the resulting fractal dimension on the embedding dimension and the scaling properties (isothermal critical exponent) of the system. Taking into account the finite size effects we are able to calculate the size of the critical cluster in terms of the total size of the system, the critical temperature and the effective coupling of the long wavelength interaction at the critical point. We also show that the size of the cluster has to be identified with the correlation length at criticality. Finally, within the framework of the mean field approximation, we extend our local considerations to obtain a global description of the system., Comment: 1 LaTeX file, 4 figures in ps-files. Accepted for publication in Physical Review E

Published
2000
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10. Pion Fluctuations near the QCD Critical Point

Author

Antoniou, N. G., Contoyiannis, Y. F., and Diakonos, F. K.

Subjects
High Energy Physics - Phenomenology
Abstract

A critical point of second order, belonging to the universality class of the 3d Ising model, has recently been advocated as a strong candidate for the critical behaviour (at high temperatures) of QCD with non-zero quark masses. The implications of this conjecture are investigated in the multiparticle environment of high-energy collisions. A universal intermittency pattern of pion-density fluctuations is found, at the critical point, and its association to the critical exponents is discussed. A Monte Carlo simulation of critical events, in heavy-ion collisions, reveals the detailed structure of these fluctuations, suggesting a framework of (event-by-event) measurements in which the critical theory of QCD may become falsifiable., Comment: 8 pages, 3 figures (ps)

Published
1999

11. Fractals at T=Tc due to instanton-like configurations

Author

Antoniou, N. G., Contoyiannis, Y. F., Diakonos, F. K., and Papadopoulos, C. G.

Subjects
High Energy Physics - Phenomenology
Abstract

We investigate the geometry of the critical fluctuations for a general system undergoing a thermal second order phase transition. Adopting a generalized effective action for the local description of the fluctuations of the order parameter at the critical point ($T=T_c$) we show that instanton-like configurations, corresponding to the minima of the effective action functional, build up clusters with fractal geometry characterizing locally the critical fluctuations. The connection between the corresponding (local) fractal dimension and the critical exponents is derived. Possible extension of the local geometry of the system to a global picture is also discussed., Comment: To appear in Physical Review Letters

Published
1998
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14. Criticality in a hybrid spin model with Fermi-Dirac statistics

Author

Contoyiannis, Y. F. Potirakis, S. M. Diakonos, F. K. and Kosmidis, E. K.

Subjects
Condensed Matter::Statistical Mechanics, Condensed Matter::Disordered Systems and Neural Networks
Abstract

Combining concepts of artificial neural networks (ANNs) with the stochastic dynamics of Ising spin lattices we introduce a hybrid model, the hybrid spin model (HSM). We find that the HSM carries the critical/tricritical fluctuations of the 2D Ising model and allows for an accurate estimation of the isothermal critical/tricritical exponents of 2D Ising universality class. Our work clearly demonstrates that HSM launches a new category of models supporting alternative pathways for the realization of criticality in complex networks artificial or real. (C) 2021 Elsevier B.V. All rights reserved.

Published
2021

24. PROBING THE QCD CRITICAL POINT IN NUCLEAR COLLISIONS.

Author

ANTONIOU, N. G., CONTOYIANNIS, Y. F., DIAKONOS, F. K., GEORGOPOULOS, G., PETRIDIS, A., VASSILIOU, M., and PAPADOPOULOS, C. G.

Subjects
QUANTUM chromodynamics, PHASE transitions, MONTE Carlo method, PHASE diagrams, SUPERFLUIDITY
Published
2000

26. Intermittency in Stock Market Dynamics.

Author

OZUN, A., CONTOYIANNIS, Y. F., DIAKONOS, F. K., ANIAS, M. H., and AGAFAS, L. M.

Subjects
STOCK exchanges, PRICE fluctuations, STOCK prices, DOW Jones industrial average, INTERMITTENCY (Nuclear physics)
Abstract

This article uses the critical fluctuations method in physics to detect intermittent fluctuations in stock market dynamics. The method is able to extract self-similar patterns based on the distribution of properly defined laminar lengths in stock prices. The authors analyze time series from the NYSE that contain share values from the last 20 years to look for non-conventional fluctuations. Similar analysis is performed for the Dow Jones Index during the same time interval. At the level of prices, the authors do not observe any signature of non-conventional statistics; however, interestingly enough, they find an excellent power-law laminar length distribution for the time series constructed from the difference between the highest and the lowest share prices or global index values within a day. The authors conclude that the evolution of the amplitude of the daily fluctuations of the share prices and the global index contains an intermittent dynamic component with critical characteristics. The article provides an original methodology derived from physics to examine stock market behaviors and empirically concludes that most "efficient" world stock markets, in fact, show deterministic patterns. [ABSTRACT FROM AUTHOR]

Published
2014
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