A mathematical modeling approach to infectious diseases cross diffusion PDE models for epidemiology
The intent of this book is to provide a methodology for the analysis of infectious diseases by computer-based mathematical models. The approach is based on ordinary differential equations (ODEs) that provide time variation of the model dependent variables and partial differential equations (PDEs) th...
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| Main Author: | |
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| Format: | Book |
| Language: | English |
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New Jersey
World Scientific
2018
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| Subjects: | |
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| Summary: | The intent of this book is to provide a methodology for the analysis of infectious diseases by computer-based mathematical models. The approach is based on ordinary differential equations (ODEs) that provide time variation of the model dependent variables and partial differential equations (PDEs) that provide time and spatial (spatiotemporal) variations of the model dependent variables.The starting point is a basic ODE SIR (Susceptible Infected Recovered) model that defines the S, I, R populations as a function of time The ODE/PDE methodology is open ended and facilitates the development of computer-based models which hopefully can elucidate the causes/conditions of infectious disease evolution and suggest methods of control. |
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| Physical Description: | xii, 447 pages illustrations 24 cm. |
| Bibliography: | Includes bibliographical references and index. |
| ISBN: | 9789813238787 (hardcover) 981323878X (hardcover) |