Interface problems and methods in biological and physical flows / / editors, Boo Cheong Khoo, Zhilin Li, Ping Lin
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| Titolo: |
Interface problems and methods in biological and physical flows / / editors, Boo Cheong Khoo, Zhilin Li, Ping Lin
|
| Pubblicazione: | Hackensack, NJ, : World Scientific, c2009 |
| Edizione: | 1st ed. |
| Descrizione fisica: | 1 online resource (184 p.) |
| Disciplina: | 532/.0510151 |
| Soggetto topico: | Interfaces (Physical sciences) - Mathematics |
| Fluid dynamics - Mathematics | |
| Altri autori: |
KhooBoo Cheong <1958->
LiZhilin <1956->
LinPing <1963->
|
| Note generali: | Description based upon print version of record. |
| Nota di bibliografia: | Includes bibliographical references. |
| Nota di contenuto: | Foreword; Preface; CONTENTS; An Introduction to the Immersed Boundary and the Immersed Interface Methods Robert H. Dillon and Zhilin Li; 1. Introduction; Part I AN INTRODUCTION TO THE IMMERSED BOUNDARY METHOD; 2. Overview of Immersed Boundary Method; 3. Some Applications of the IB Method; 4. Some Technical Issues of the IB Method; Part II A TUTORIAL OF THE IMMERSED INTERFACE METHOD; 5. The Immersed Interface Method for Elliptic Interface Problems; 6. The Augmented Immersed Interface Method and Applications; 7. Simplifying the Immersed Interface Method by Removing Source Singularities |
| 8. The Immersed Interface Method Using Finite Element Formulations9. The IIM for Free Boundary or Moving Interface Problems; 10. Acknowledgements; References; Lecture Notes on Nonlinear Tumor Growth: Modeling and Simulation John S. Lowengrub, Vittorio Cristini, Hermann B. Frieboes, Xiangrong Li, Paul Macklin, Sandeep Sanga, Steven M. Wise and Xiaoming Zheng; 0. Introduction; 1. Tumor Growth in Homogeneous Tissuea; 1.1. Overview; 1.2. Discrete modeling; 1.3. Continuum modeling; 1.4. Regimes of growth; 1.5. Comparison with experiment; 1.6. Linear analysis; 1.7. Nonlinear results | |
| 2. Tumor Growth in Heterogeneous Tissueb2.1. Overview; 2.2. Governing equations; 2.3. Nonlinear results; 3. Tumor Growth and Neovascularizationc; 3.1. Overview; 3.2. The model; 3.3. Nonlinear results; 4. Conclusion and Future Research Directions; References; Progress in Modeling Pulsed Detonations Frank K. Lu and R. Bellini; 1. Introduction and Literature Review; 2. Overview of Early Studies in Detonations; 2.1. Structure of detonation waves; 3. Review of Numerical Simulation of Pulse Detonation Engines; 3.1. Detonation initiation; 3.2. Detonation stability; 3.3. Numerics and algorithms | |
| 3.5. Turbulence modeling3.6. Chemical kinetics; 4. The Governing Equations; 5. Numerical Method; 5.1. Local ignition averaging method; 6. Numerical Simulations of Pulse Detonations; 6.1. One-dimensional detonation wave propagation; 6.2. Detonation wave propagation through an area enlargement; 7. Outlook and Conclusions; Acknowledgments; References; Direct Numerical Simulations of Multiphase Flows Gr etar Tryggvason and Jiacai Lu; 1. Introduction; 2. Governing Equations; 3. Numerical Method; 4. Results; 5. Conclusions; Acknowledgments; References | |
| Sommario/riassunto: | This volume showcases lecture notes collected from tutorials presented at the Workshop on Moving Interface Problems and Applications in Fluid Dynamics that was held between January 8 and March 31, 2007 at the Institute for Mathematical Sciences, National University of Singapore. As part of the program, these tutorials were conducted by specialists within their respective areas such as Robert Dillon, Zhilin Li, John Lowengrub, Frank Lu and Gretar Tryggvason. The topics in the program encompass modeling and simulations of biological flow coupled to deformable tissue/elastic structure, shock wave |
| Titolo autorizzato: | Interface problems and methods in biological and physical flows |
| ISBN: | 1-282-44289-9 |
| 9786612442896 | |
| 981-283-785-X | |
| Formato: | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione: | Inglese |
| Record Nr.: | 9910825977503321 |
| Lo trovi qui: | Univ. Federico II |
| Opac: | Controlla la disponibilità qui |
Serie:
Lecture notes series (National University of Singapore. Institute for Mathematical Sciences) ; ; v. 17.