Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study
- Autores
- Bab, Marisa Alejandra; Fabricius, Gabriel; Albano, Ezequiel Vicente
- Año de publicación
- 2005
- Idioma
- inglés
- Tipo de recurso
- artículo
- Estado
- versión publicada
- Descripción
- The short-time dynamic evolution of an Ising model embedded in an infinitely ramified fractal structure with noninteger Hausdorff dimension was studied using Monte Carlo simulations. Completely ordered and disordered spin configurations were used as initial states for the dynamic simulations. In both cases, the evolution of the physical observables follows a power-law behavior. Based on this fact, the complete set of critical exponents characteristic of a second-order phase transition was evaluated. Also, the dynamic exponent θ of the critical initial increase in magnetization, as well as the critical temperature, were computed. The exponent θ exhibits a weak dependence on the initial (small) magnetization. On the other hand, the dynamic exponent z shows a systematic decrease when the segmentation step is increased, i.e., when the system size becomes larger. Our results suggest that the effective noninteger dimension for the second-order phase transition is noticeably smaller than the Hausdorff dimension. Even when the behavior of the magnetization (in the case of the ordered initial state) and the autocorrelation (in the case of the disordered initial state) with time are very well fitted by power laws, the precision of our simulations allows us to detect the presence of a soft oscillation of the same type in both magnitudes that we attribute to the topological details of the generating cell at any scale.
Instituto de Investigaciones Fisicoquímicas Teóricas y Aplicadas - Materia
-
Física
Sierpinski carpet
Mathematical analysis
Type (model theory)
Phase transition
Critical exponent
Hausdorff dimension
Exponent
Mathematics
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:10915/126071
Ver los metadatos del registro completo
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Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics studyBab, Marisa AlejandraFabricius, GabrielAlbano, Ezequiel VicenteFísicaSierpinski carpetMathematical analysisType (model theory)Phase transitionCritical exponentHausdorff dimensionExponentMathematicsFractalIsing modelThe short-time dynamic evolution of an Ising model embedded in an infinitely ramified fractal structure with noninteger Hausdorff dimension was studied using Monte Carlo simulations. Completely ordered and disordered spin configurations were used as initial states for the dynamic simulations. In both cases, the evolution of the physical observables follows a power-law behavior. Based on this fact, the complete set of critical exponents characteristic of a second-order phase transition was evaluated. Also, the dynamic exponent θ of the critical initial increase in magnetization, as well as the critical temperature, were computed. The exponent θ exhibits a weak dependence on the initial (small) magnetization. On the other hand, the dynamic exponent z shows a systematic decrease when the segmentation step is increased, i.e., when the system size becomes larger. Our results suggest that the effective noninteger dimension for the second-order phase transition is noticeably smaller than the Hausdorff dimension. Even when the behavior of the magnetization (in the case of the ordered initial state) and the autocorrelation (in the case of the disordered initial state) with time are very well fitted by power laws, the precision of our simulations allows us to detect the presence of a soft oscillation of the same type in both magnitudes that we attribute to the topological details of the generating cell at any scale.Instituto de Investigaciones Fisicoquímicas Teóricas y Aplicadas2005-03-25info: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/10915/126071enginfo:eu-repo/semantics/altIdentifier/issn/1539-3755info:eu-repo/semantics/altIdentifier/issn/1550-2376info:eu-repo/semantics/altIdentifier/arxiv/cond-mat/0603387info:eu-repo/semantics/altIdentifier/doi/10.1103/physreve.71.036139info: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:UNLP2025-10-15T11:22:06Zoai:sedici.unlp.edu.ar:10915/126071Institucionalhttp://sedici.unlp.edu.ar/Universidad públicaNo correspondehttp://sedici.unlp.edu.ar/oai/snrdalira@sedici.unlp.edu.arArgentinaNo correspondeNo correspondeNo correspondeopendoar:13292025-10-15 11:22:06.411SEDICI (UNLP) - Universidad Nacional de La Platafalse |
| dc.title.none.fl_str_mv |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| title |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| spellingShingle |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study Bab, Marisa Alejandra Física Sierpinski carpet Mathematical analysis Type (model theory) Phase transition Critical exponent Hausdorff dimension Exponent Mathematics Fractal Ising model |
| title_short |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| title_full |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| title_fullStr |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| title_full_unstemmed |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| title_sort |
Critical behavior of an Ising system on the Sierpinski carpet: a short-time dynamics study |
| 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 Mathematical analysis Type (model theory) Phase transition Critical exponent Hausdorff dimension Exponent Mathematics Fractal Ising model |
| topic |
Física Sierpinski carpet Mathematical analysis Type (model theory) Phase transition Critical exponent Hausdorff dimension Exponent Mathematics Fractal Ising model |
| dc.description.none.fl_txt_mv |
The short-time dynamic evolution of an Ising model embedded in an infinitely ramified fractal structure with noninteger Hausdorff dimension was studied using Monte Carlo simulations. Completely ordered and disordered spin configurations were used as initial states for the dynamic simulations. In both cases, the evolution of the physical observables follows a power-law behavior. Based on this fact, the complete set of critical exponents characteristic of a second-order phase transition was evaluated. Also, the dynamic exponent θ of the critical initial increase in magnetization, as well as the critical temperature, were computed. The exponent θ exhibits a weak dependence on the initial (small) magnetization. On the other hand, the dynamic exponent z shows a systematic decrease when the segmentation step is increased, i.e., when the system size becomes larger. Our results suggest that the effective noninteger dimension for the second-order phase transition is noticeably smaller than the Hausdorff dimension. Even when the behavior of the magnetization (in the case of the ordered initial state) and the autocorrelation (in the case of the disordered initial state) with time are very well fitted by power laws, the precision of our simulations allows us to detect the presence of a soft oscillation of the same type in both magnitudes that we attribute to the topological details of the generating cell at any scale. Instituto de Investigaciones Fisicoquímicas Teóricas y Aplicadas |
| description |
The short-time dynamic evolution of an Ising model embedded in an infinitely ramified fractal structure with noninteger Hausdorff dimension was studied using Monte Carlo simulations. Completely ordered and disordered spin configurations were used as initial states for the dynamic simulations. In both cases, the evolution of the physical observables follows a power-law behavior. Based on this fact, the complete set of critical exponents characteristic of a second-order phase transition was evaluated. Also, the dynamic exponent θ of the critical initial increase in magnetization, as well as the critical temperature, were computed. The exponent θ exhibits a weak dependence on the initial (small) magnetization. On the other hand, the dynamic exponent z shows a systematic decrease when the segmentation step is increased, i.e., when the system size becomes larger. Our results suggest that the effective noninteger dimension for the second-order phase transition is noticeably smaller than the Hausdorff dimension. Even when the behavior of the magnetization (in the case of the ordered initial state) and the autocorrelation (in the case of the disordered initial state) with time are very well fitted by power laws, the precision of our simulations allows us to detect the presence of a soft oscillation of the same type in both magnitudes that we attribute to the topological details of the generating cell at any scale. |
| publishDate |
2005 |
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2005-03-25 |
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http://sedici.unlp.edu.ar/handle/10915/126071 |
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eng |
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eng |
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