Cellular automata modeling of physical systems / Bastien Chopard and Michel Droz.
Tipo de material: TextoSeries Collection Aleá-SaclayDetalles de publicación: Cambridge, [England] ; New York : Cambridge University Press, 2005. Descripción: XII, 341 p. : il. ; 26 cmISBN: 0521673453; 9780521673457Tema(s): Statistical physics | Cellular automata | Física estadística | Autómatas celulares | Transformaciones de fase (Física estadística)Resumen: This book provides a self-contained introduction to cellular automata and lattice Boltzmann techniques. Beginning with a chapter introducing the basic concepts of this developing field, a second chapter describes methods used in cellular automata modeling. Following chapters discuss the statistical mechanics of lattice gases, diffusion phenomena, reaction-diffusion processes and non-equilibrium phase transitions. A final chapter looks at other models and applications, such as wave propagation and multiparticle fluids. With a pedagogic approach, the volume focuses on the use of cellular automata in the framework of equilibrium and non-equilibrium statistical physics. It also emphasises application-oriented problems such as fluid dynamics and pattern formation. The book contains many examples and problems. A glossary and a detailed bibliography are also included. This will be a valuable book for graduate students and researchers working in statistical physics, solid state physics, chemical physics and computer science.Tipo de ítem | Biblioteca de origen | Signatura | URL | Estado | Fecha de vencimiento | Código de barras | Reserva de ítems |
---|---|---|---|---|---|---|---|
Monografías | 03. BIBLIOTECA INGENIERÍA PUERTO REAL | 531.19/CHO/cel (Navegar estantería(Abre debajo)) | Texto completo | Prestado | 31/01/2025 | 3742852157 |
Originally published in 1998.
Publicación original 1998
Incluye bibliografía p.: 313-326 e índice
This book provides a self-contained introduction to cellular automata and lattice Boltzmann techniques. Beginning with a chapter introducing the basic concepts of this developing field, a second chapter describes methods used in cellular automata modeling. Following chapters discuss the statistical mechanics of lattice gases, diffusion phenomena, reaction-diffusion processes and non-equilibrium phase transitions. A final chapter looks at other models and applications, such as wave propagation and multiparticle fluids. With a pedagogic approach, the volume focuses on the use of cellular automata in the framework of equilibrium and non-equilibrium statistical physics. It also emphasises application-oriented problems such as fluid dynamics and pattern formation. The book contains many examples and problems. A glossary and a detailed bibliography are also included. This will be a valuable book for graduate students and researchers working in statistical physics, solid state physics, chemical physics and computer science.
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