Título :	Abstract Parabolic Evolution Equations and their Applications
Tipo de documento:	documento electrónico
Autores:	Atsushi Yagi ; SpringerLink (Online service)
Editorial:	Berlin, Heidelberg : Springer Berlin Heidelberg
Fecha de publicación:	2010
Colección:	Springer Monographs in Mathematics, ISSN 1439-7382
Número de páginas:	XVIII, 581 p. 6 illus
Il.:	online resource
ISBN/ISSN/DL:	978-3-642-04631-5
Idioma :	Inglés (eng)
Palabras clave:	Mathematics  Dynamics  Ergodic  theory  Partial  differential  equations  Biomathematics  Differential  Equations  Dynamical  Systems  and  Theory  Mathematical  Computational  Biology
Clasificación:	51 Matemáticas
Resumen:	The semigroup methods are known as a powerful tool for analyzing nonlinear diffusion equations and systems. The author has studied abstract parabolic evolution equations and their applications to nonlinear diffusion equations and systems for more than 30 years. He gives first, after reviewing the theory of analytic semigroups, an overview of the theories of linear, semilinear and quasilinear abstract parabolic evolution equations as well as general strategies for constructing dynamical systems, attractors and stable-unstable manifolds associated with those nonlinear evolution equations. In the second half of the book, he shows how to apply the abstract results to various models in the real world focusing on various self-organization models: semiconductor model, activator-inhibitor model, B-Z reaction model, forest kinematic model, chemotaxis model, termite mound building model, phase transition model, and Lotka-Volterra competition model. The process and techniques are explained concretely in order to analyze nonlinear diffusion models by using the methods of abstract evolution equations. Thus the present book fills the gaps of related titles that either treat only very theoretical examples of equations or introduce many interesting models from Biology and Ecology, but do not base analytical arguments upon rigorous mathematical theories
Nota de contenido:	Preliminaries -- Sectorial Operators -- Linear Evolution Equations -- Semilinear Evolution Equations -- Quasilinear Evolution Equations -- Dynamical Systems -- Numerical Analysis -- Semiconductor Models -- Activator–Inhibitor Models -- Belousov–Zhabotinskii Reaction Models -- Forest Kinematic Model -- Chemotaxis Models -- Termite Mound Building Model -- Adsorbate-Induced Phase Transition Model -- Lotka–Volterra Competition Model with Cross-Diffusion -- Characterization of Domains of Fractional Powers
En línea:	http://dx.doi.org/10.1007/978-3-642-04631-5
Link:	https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33724

Abstract Parabolic Evolution Equations and their Applications [documento electrónico] / Atsushi Yagi ; SpringerLink (Online service) . - Berlin, Heidelberg : Springer Berlin Heidelberg, 2010 . - XVIII, 581 p. 6 illus : online resource. - (Springer Monographs in Mathematics, ISSN 1439-7382) .
ISBN : 978-3-642-04631-5
Idioma : Inglés (eng)

Palabras clave:	Mathematics  Dynamics  Ergodic  theory  Partial  differential  equations  Biomathematics  Differential  Equations  Dynamical  Systems  and  Theory  Mathematical  Computational  Biology
Clasificación:	51 Matemáticas
Resumen:	The semigroup methods are known as a powerful tool for analyzing nonlinear diffusion equations and systems. The author has studied abstract parabolic evolution equations and their applications to nonlinear diffusion equations and systems for more than 30 years. He gives first, after reviewing the theory of analytic semigroups, an overview of the theories of linear, semilinear and quasilinear abstract parabolic evolution equations as well as general strategies for constructing dynamical systems, attractors and stable-unstable manifolds associated with those nonlinear evolution equations. In the second half of the book, he shows how to apply the abstract results to various models in the real world focusing on various self-organization models: semiconductor model, activator-inhibitor model, B-Z reaction model, forest kinematic model, chemotaxis model, termite mound building model, phase transition model, and Lotka-Volterra competition model. The process and techniques are explained concretely in order to analyze nonlinear diffusion models by using the methods of abstract evolution equations. Thus the present book fills the gaps of related titles that either treat only very theoretical examples of equations or introduce many interesting models from Biology and Ecology, but do not base analytical arguments upon rigorous mathematical theories
Nota de contenido:	Preliminaries -- Sectorial Operators -- Linear Evolution Equations -- Semilinear Evolution Equations -- Quasilinear Evolution Equations -- Dynamical Systems -- Numerical Analysis -- Semiconductor Models -- Activator–Inhibitor Models -- Belousov–Zhabotinskii Reaction Models -- Forest Kinematic Model -- Chemotaxis Models -- Termite Mound Building Model -- Adsorbate-Induced Phase Transition Model -- Lotka–Volterra Competition Model with Cross-Diffusion -- Characterization of Domains of Fractional Powers
En línea:	http://dx.doi.org/10.1007/978-3-642-04631-5
Link:	https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33724