Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate
- Autores
- Bab, Marisa Alejandra; Fabricius, Gabriel; Albano, Ezequiel Vicente
- Año de publicación
- 2006
- Idioma
- inglés
- Tipo de recurso
- artículo
- Estado
- versión publicada
- Descripción
- The nonequilibrium critical dynamics of the Ising magnet on a fractal substrate, namely the Sierpinski carpet with Hausdorff dimension d H = 1.7925 , has been studied within the short-time regime by means of Monte Carlo simulations. The evolution of the physical observables was followed at criticality, after both annealing ordered spin configurations (ground state) and quenching disordered initial configurations (high temperature state), for three segmentation steps of the fractal. We have obtained evidence showing that during these relaxation processes both the growth and the fragmentation of magnetic domains become influenced by the hierarchical structure of the substrate. In fact, the interplay between the dynamic behavior of the magnet and the underlying fractal leads to the emergence of a logarithmic-periodic oscillation, superimposed to a power law, which has been observed in the time dependence of both the decay of the magnetization and its logarithmic derivative. These oscillations have been carefully characterized in order to determine the critical temperature of the second-order phase transition and the critical exponents corresponding to the short-time regime. The effects of the substrate can also be observed from the dependence of the effective critical exponents on the segmentation step. The exponent θ of the initial increase of the magnetization has also been obtained and the results suggest that it would be almost independent of the fractal dimension of the susbstrate, provided that d H is close enough to d = 2 . The oscillations have been discussed within the framework of the discrete scale invariance of the substrate.
Instituto de Investigaciones Fisicoquímicas Teóricas y Aplicadas - Materia
-
Física
Sierpinski carpet
Physics
Statistical physics
Scale invariance
Phase transition
Critical exponent
Hausdorff dimension
Fractal dimension
Condensed matter physics
Fractal
Ising model - Nivel de accesibilidad
- acceso abierto
- Condiciones de uso
- http://creativecommons.org/licenses/by-nc-sa/4.0/
- Repositorio
.jpg)
- Institución
- Universidad Nacional de La Plata
- OAI Identificador
- oai:sedici.unlp.edu.ar:10915/126475
Ver los metadatos del registro completo
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Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrateBab, Marisa AlejandraFabricius, GabrielAlbano, Ezequiel VicenteFísicaSierpinski carpetPhysicsStatistical physicsScale invariancePhase transitionCritical exponentHausdorff dimensionFractal dimensionCondensed matter physicsFractalIsing modelThe nonequilibrium critical dynamics of the Ising magnet on a fractal substrate, namely the Sierpinski carpet with Hausdorff dimension d H = 1.7925 , has been studied within the short-time regime by means of Monte Carlo simulations. The evolution of the physical observables was followed at criticality, after both annealing ordered spin configurations (ground state) and quenching disordered initial configurations (high temperature state), for three segmentation steps of the fractal. We have obtained evidence showing that during these relaxation processes both the growth and the fragmentation of magnetic domains become influenced by the hierarchical structure of the substrate. In fact, the interplay between the dynamic behavior of the magnet and the underlying fractal leads to the emergence of a logarithmic-periodic oscillation, superimposed to a power law, which has been observed in the time dependence of both the decay of the magnetization and its logarithmic derivative. These oscillations have been carefully characterized in order to determine the critical temperature of the second-order phase transition and the critical exponents corresponding to the short-time regime. The effects of the substrate can also be observed from the dependence of the effective critical exponents on the segmentation step. The exponent θ of the initial increase of the magnetization has also been obtained and the results suggest that it would be almost independent of the fractal dimension of the susbstrate, provided that d H is close enough to d = 2 . The oscillations have been discussed within the framework of the discrete scale invariance of the substrate.Instituto de Investigaciones Fisicoquímicas Teóricas y Aplicadas2006-10-26info:eu-repo/semantics/articleinfo:eu-repo/semantics/publishedVersionArticulohttp://purl.org/coar/resource_type/c_6501info:ar-repo/semantics/articuloapplication/pdfhttp://sedici.unlp.edu.ar/handle/10915/126475enginfo:eu-repo/semantics/altIdentifier/issn/1539-3755info:eu-repo/semantics/altIdentifier/issn/1550-2376info:eu-repo/semantics/altIdentifier/arxiv/cond-mat/0603386info:eu-repo/semantics/altIdentifier/doi/10.1103/physreve.74.041123info:eu-repo/semantics/openAccesshttp://creativecommons.org/licenses/by-nc-sa/4.0/Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International (CC BY-NC-SA 4.0)reponame:SEDICI (UNLP)instname:Universidad Nacional de La Platainstacron:UNLP2025-09-10T12:32:56Zoai:sedici.unlp.edu.ar:10915/126475Institucionalhttp://sedici.unlp.edu.ar/Universidad públicaNo correspondehttp://sedici.unlp.edu.ar/oai/snrdalira@sedici.unlp.edu.arArgentinaNo correspondeNo correspondeNo correspondeopendoar:13292025-09-10 12:32:57.222SEDICI (UNLP) - Universidad Nacional de La Platafalse |
| dc.title.none.fl_str_mv |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| title |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| spellingShingle |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate Bab, Marisa Alejandra Física Sierpinski carpet Physics Statistical physics Scale invariance Phase transition Critical exponent Hausdorff dimension Fractal dimension Condensed matter physics Fractal Ising model |
| title_short |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| title_full |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| title_fullStr |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| title_full_unstemmed |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| title_sort |
Discrete scale invariance effects in the nonequilibrium critical behavior of the Ising magnet on a fractal substrate |
| dc.creator.none.fl_str_mv |
Bab, Marisa Alejandra Fabricius, Gabriel Albano, Ezequiel Vicente |
| author |
Bab, Marisa Alejandra |
| author_facet |
Bab, Marisa Alejandra Fabricius, Gabriel Albano, Ezequiel Vicente |
| author_role |
author |
| author2 |
Fabricius, Gabriel Albano, Ezequiel Vicente |
| author2_role |
author author |
| dc.subject.none.fl_str_mv |
Física Sierpinski carpet Physics Statistical physics Scale invariance Phase transition Critical exponent Hausdorff dimension Fractal dimension Condensed matter physics Fractal Ising model |
| topic |
Física Sierpinski carpet Physics Statistical physics Scale invariance Phase transition Critical exponent Hausdorff dimension Fractal dimension Condensed matter physics Fractal Ising model |
| dc.description.none.fl_txt_mv |
The nonequilibrium critical dynamics of the Ising magnet on a fractal substrate, namely the Sierpinski carpet with Hausdorff dimension d H = 1.7925 , has been studied within the short-time regime by means of Monte Carlo simulations. The evolution of the physical observables was followed at criticality, after both annealing ordered spin configurations (ground state) and quenching disordered initial configurations (high temperature state), for three segmentation steps of the fractal. We have obtained evidence showing that during these relaxation processes both the growth and the fragmentation of magnetic domains become influenced by the hierarchical structure of the substrate. In fact, the interplay between the dynamic behavior of the magnet and the underlying fractal leads to the emergence of a logarithmic-periodic oscillation, superimposed to a power law, which has been observed in the time dependence of both the decay of the magnetization and its logarithmic derivative. These oscillations have been carefully characterized in order to determine the critical temperature of the second-order phase transition and the critical exponents corresponding to the short-time regime. The effects of the substrate can also be observed from the dependence of the effective critical exponents on the segmentation step. The exponent θ of the initial increase of the magnetization has also been obtained and the results suggest that it would be almost independent of the fractal dimension of the susbstrate, provided that d H is close enough to d = 2 . The oscillations have been discussed within the framework of the discrete scale invariance of the substrate. Instituto de Investigaciones Fisicoquímicas Teóricas y Aplicadas |
| description |
The nonequilibrium critical dynamics of the Ising magnet on a fractal substrate, namely the Sierpinski carpet with Hausdorff dimension d H = 1.7925 , has been studied within the short-time regime by means of Monte Carlo simulations. The evolution of the physical observables was followed at criticality, after both annealing ordered spin configurations (ground state) and quenching disordered initial configurations (high temperature state), for three segmentation steps of the fractal. We have obtained evidence showing that during these relaxation processes both the growth and the fragmentation of magnetic domains become influenced by the hierarchical structure of the substrate. In fact, the interplay between the dynamic behavior of the magnet and the underlying fractal leads to the emergence of a logarithmic-periodic oscillation, superimposed to a power law, which has been observed in the time dependence of both the decay of the magnetization and its logarithmic derivative. These oscillations have been carefully characterized in order to determine the critical temperature of the second-order phase transition and the critical exponents corresponding to the short-time regime. The effects of the substrate can also be observed from the dependence of the effective critical exponents on the segmentation step. The exponent θ of the initial increase of the magnetization has also been obtained and the results suggest that it would be almost independent of the fractal dimension of the susbstrate, provided that d H is close enough to d = 2 . The oscillations have been discussed within the framework of the discrete scale invariance of the substrate. |
| publishDate |
2006 |
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2006-10-26 |
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publishedVersion |
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http://sedici.unlp.edu.ar/handle/10915/126475 |
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eng |
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eng |
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