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Modeling and analyzing the dynamics of chemical mixtures by means of differ- tial equations is one of the prime concerns of chemical engineering theorists. These equations often take the form of systems of nonlinear parabolic partial d- ferential equations, or reaction-diffusion equations, when there is diffusion of chemical substances involved. A good overview of this endeavor can be had by re- ing the two volumes by R. Aris (1975), who himself was one of the main contributors to the theory. Enthusiasm for the models developed has been shared by parts of the mathematical community, and these models have, in fact, provided motivation for some beautiful mathematical results. There are analogies between chemical reactors and certain biological systems. One such analogy is rather obvious: a single living organism is a dynamic structure built of molecules and ions, many of which react and diffuse. Other analogies are less obvious; for example, the electric potential of a membrane can diffuse like a chemical, and of course can interact with real chemical species (ions) which are transported through the membrane. These facts gave rise to Hodgkin's and Huxley's celebrated model for the propagation of nerve signals. On the level of populations, individuals interact and move about, and so it is not surprising that here, again, the simplest continuous space-time interaction-migration models have the same g- eral appearance as those for diffusing and reacting chemical systems.
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Contenuti
Preface and General Introduction.- 1. Modeling Considerations.- 1.1 Basic hypotheses.- 1.2 Redistribution processes.- 1.3 Boundaries and interfaces.- 1.4 Reactions with migration.- 1.5 The reaction mechanism.- 1.6 Positivity of the density.- 1.7 Homogeneous systems.- 1.8 Modeling the rate functions.- 1.9 Colony models.- 1.10 Simplifying the model by means of asymptotics.- 2. Fisher’s Nonlinear Diffusion Equation and Selection-Migration Models.- 2.1 Historical overview.- 2.2 Assumptions for the present model.- 2.3 Reduction to a simpler model.- 2.4 Comments on the comparison of models.- 2.5 The question of formal approximation.- 2.6 The case of a discontinuous carrying capacity.- 2.7 Discussion.- 3. Formulation of Mathematical Problems.- 3.1 The standard problems.- 3.2 Asymptotic states.- 3.3 Existence questions.- 4. The Scalar Case.- 4.1 Comparison methods.- 4.2 Derivative estimates.- 4.3 Stability and instability of stationary solutions.- 4.4 Traveling waves.- 4.5 Global stability of traveling waves.- 4.6 More on Lyapunov methods.- 4.7 Further results in the bistable case.- 4.8 Stationary solutions for x-dependent source function.- 5. Systems: Comparison Techniques.- 5.1 Basic comparison theorems.- 5.2 An example from ecology.- 6. Systems: Linear Stability Techniques.- 6.1 Stability considerations for nonconstant stationary solutions and traveling waves.- 6.2 Pattern stability for a class of model systems.- 7. Systems: Bifurcation Techniques.- 7.1 Small amplitude stationary solutions.- 7.2 Small amplitude wave trains.- 7.3 Bibliographical discussion.- 8. Systems: Singular Perturbation and Scaling Techniques.- 8.1 Fast wave trains.- 8.2 Sharp fronts (review).- 8.3 Slowly varying waves (review).- 8.4 Partitioning (review).- 8.5 Transient asymptotics.- 9. References to Other Topics.- 9.1 Reaction-diffusion systems modeling nerve signal propagation.- 9.2 Miscellaneous.- References.
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- EditoreSpringer Berlin Heidelberg
- Data di pubblicazione1979
- ISBN 10 3540091173
- ISBN 13 9783540091172
- RilegaturaCopertina flessibile
- LinguaInglese
- Numero di pagine196
- Contatto del produttorenon disponibile
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Mathematical aspects of reacting and diffusing systems. Lecture notes in biomathematics; 28.
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Softcover. iv, 185 p. Ex-library with stamp and library-signature. GOOD condition, some traces of use. Ehem. Bibliotheksexemplar mit Signatur und Stempel. GUTER Zustand, ein paar Gebrauchsspuren. C-04987 3540091173 Sprache: Englisch Gewicht in Gramm: 550. Codice articolo 2491231
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Mathematical Aspects of Reacting and Diffusing Systems. (= Lecture Notes in Biomathematics - Volume 28).
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185 pp. with some figures, (185 S. mit Abbildungen), 3540091173 Sprache: Englisch Gewicht in Gramm: 380 Groß 8°, Original-Karton (Softcover), Bibliotheks-Exemplar (ordnungsgemäß entwidmet) mit Rückenschild, Stempel auf Titel, Ecken minimal eselsohrig, insgesamt gutes und innen sauberes Exemplar, Codice articolo 82183
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Mathematical Aspects of Reacting and Diffusing Systems Lecture Notes in Biomathematics, Band 28
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ISBN 10: 3540091173
ISBN 13: 9783540091172
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Broschiert. Condizione: Gut. 185 Seiten Der Erhaltungszustand des hier angebotenen Werks ist trotz seiner Bibliotheksnutzung sehr sauber. Es befindet sich neben dem Rückenschild lediglich ein Bibliotheksstempel im Buch; ordnungsgemäß entwidmet. Einbandkanten sind leicht bestoßen. In ENGLISCHER Sprache. Sprache: Englisch Gewicht in Gramm: 330. Codice articolo 1811470
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Mathematical Aspects of Reacting and Diffusing Systems
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Condizione: New. Dieser Artikel ist ein Print on Demand Artikel und wird nach Ihrer Bestellung fuer Sie gedruckt. Modeling and analyzing the dynamics of chemical mixtures by means of differ- tial equations is one of the prime concerns of chemical engineering theorists. These equations often take the form of systems of nonlinear parabolic partial d- ferential equations,. Codice articolo 4880343
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Mathematical Aspects of Reacting and Diffusing Systems (Lecture Notes in Biomathematics, 28)
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Condizione: Fair. This is an ex-library book and may have the usual library/used-book markings inside.This book has soft covers. In fair condition, suitable as a study copy. Please note the Image in this listing is a stock photo and may not match the covers of the actual item,400grams, ISBN:3540091173. Codice articolo 8249879
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Mathematical Aspects of Reacting and Diffusing Systems
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ISBN 13: 9783540091172
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Taschenbuch. Condizione: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -Modeling and analyzing the dynamics of chemical mixtures by means of differ- tial equations is one of the prime concerns of chemical engineering theorists. These equations often take the form of systems of nonlinear parabolic partial d- ferential equations, or reaction-diffusion equations, when there is diffusion of chemical substances involved. A good overview of this endeavor can be had by re- ing the two volumes by R. Aris (1975), who himself was one of the main contributors to the theory. Enthusiasm for the models developed has been shared by parts of the mathematical community, and these models have, in fact, provided motivation for some beautiful mathematical results. There are analogies between chemical reactors and certain biological systems. One such analogy is rather obvious: a single living organism is a dynamic structure built of molecules and ions, many of which react and diffuse. Other analogies are less obvious; for example, the electric potential of a membrane can diffuse like a chemical, and of course can interact with real chemical species (ions) which are transported through the membrane. These facts gave rise to Hodgkin's and Huxley's celebrated model for the propagation of nerve signals. On the level of populations, individuals interact and move about, and so it is not surprising that here, again, the simplest continuous space-time interaction-migration models have the same g- eral appearance as those for diffusing and reacting chemical systems. 196 pp. Englisch. Codice articolo 9783540091172
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Mathematical Aspects of Reacting and Diffusing Systems
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Springer Berlin Heidelberg, 1979
ISBN 10: 3540091173
ISBN 13: 9783540091172
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Taschenbuch. Condizione: Neu. Druck auf Anfrage Neuware - Printed after ordering - Modeling and analyzing the dynamics of chemical mixtures by means of differ- tial equations is one of the prime concerns of chemical engineering theorists. These equations often take the form of systems of nonlinear parabolic partial d- ferential equations, or reaction-diffusion equations, when there is diffusion of chemical substances involved. A good overview of this endeavor can be had by re- ing the two volumes by R. Aris (1975), who himself was one of the main contributors to the theory. Enthusiasm for the models developed has been shared by parts of the mathematical community, and these models have, in fact, provided motivation for some beautiful mathematical results. There are analogies between chemical reactors and certain biological systems. One such analogy is rather obvious: a single living organism is a dynamic structure built of molecules and ions, many of which react and diffuse. Other analogies are less obvious; for example, the electric potential of a membrane can diffuse like a chemical, and of course can interact with real chemical species (ions) which are transported through the membrane. These facts gave rise to Hodgkin's and Huxley's celebrated model for the propagation of nerve signals. On the level of populations, individuals interact and move about, and so it is not surprising that here, again, the simplest continuous space-time interaction-migration models have the same g- eral appearance as those for diffusing and reacting chemical systems. Codice articolo 9783540091172
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Mathematical Aspects of Reacting and Diffusing Systems
ISBN 10: 3540091173
ISBN 13: 9783540091172
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Da: buchversandmimpf2000, Emtmannsberg, BAYE, Germania
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Taschenbuch. Condizione: Neu. Neuware -Modeling and analyzing the dynamics of chemical mixtures by means of differ- tial equations is one of the prime concerns of chemical engineering theorists. These equations often take the form of systems of nonlinear parabolic partial d- ferential equations, or reaction-diffusion equations, when there is diffusion of chemical substances involved. A good overview of this endeavor can be had by re- ing the two volumes by R. Aris (1975), who himself was one of the main contributors to the theory. Enthusiasm for the models developed has been shared by parts of the mathematical community, and these models have, in fact, provided motivation for some beautiful mathematical results. There are analogies between chemical reactors and certain biological systems. One such analogy is rather obvious: a single living organism is a dynamic structure built of molecules and ions, many of which react and diffuse. Other analogies are less obvious; for example, the electric potential of a membrane can diffuse like a chemical, and of course can interact with real chemical species (ions) which are transported through the membrane. These facts gave rise to Hodgkin's and Huxley's celebrated model for the propagation of nerve signals. On the level of populations, individuals interact and move about, and so it is not surprising that here, again, the simplest continuous space-time interaction-migration models have the same g- eral appearance as those for diffusing and reacting chemical systems.Springer Verlag GmbH, Tiergartenstr. 17, 69121 Heidelberg 196 pp. Englisch. Codice articolo 9783540091172
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Mathematical Aspects of Reacting and Diffusing Systems (Lecture Notes in Biomathematics, 28)
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Mathematical Aspects of Reacting and Diffusing Systems (Lecture Notes in Biomathematics, 28)
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