Singularities In Linear Wave Propagation
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| Author | : Lars Garding |
| Publisher | : Springer |
| Total Pages | : 129 |
| Release | : 2006-11-15 |
| Genre | : Mathematics |
| ISBN | : 3540472169 |
These lecture notes stemming from a course given at the Nankai Institute for Mathematics, Tianjin, in 1986 center on the construction of parametrices for fundamental solutions of hyperbolic differential and pseudodifferential operators. The greater part collects and organizes known material relating to these constructions. The first chapter about constant coefficient operators concludes with the Herglotz-Petrovsky formula with applications to lacunas. The rest is devoted to non-degenerate operators. The main novelty is a simple construction of a global parametrix of a first-order hyperbolic pseudodifferential operator defined on the product of a manifold and the real line. At the end, its simplest singularities are analyzed in detail using the Petrovsky lacuna edition.
| Author | : Lars Gårding |
| Publisher | : Springer Verlag |
| Total Pages | : 123 |
| Release | : 1987 |
| Genre | : Mathematics |
| ISBN | : 9780387180014 |
| Author | : Michael Beals |
| Publisher | : Springer Science & Business Media |
| Total Pages | : 153 |
| Release | : 2012-12-06 |
| Genre | : Mathematics |
| ISBN | : 1461245540 |
This book developed from a series of lectures I gave at the Symposium on Nonlinear Microlocal Analysis held at Nanjing University in October. 1988. Its purpose is to give an overview of the use of microlocal analysis and commutators in the study of solutions to nonlinear wave equations. The weak singularities in the solutions to such equations behave up to a certain extent like those present in the linear case: they propagate along the null bicharacteristics of the operator. On the other hand. examples exhibiting singularities not present in the linear case can also be constructed. I have tried to present a crossection of both the regularity results and the singular examples. for problems on the interior of a domain and on domains with boundary. The main emphasis is on the case of more than one space dimen sion. since that case is treated in great detail in the paper of Rauch-Reed 159]. The results presented here have for the most part appeared elsewhere. and are the work of many authors. but a few new examples and proofs are given. I have attempted to indicate the essential ideas behind the arguments. so that only some of the results are proved in full detail. It is hoped that the central notions of the more technical proofs appearing in research papers will be illuminated by these simpler cases.
| Author | : J. Eggers |
| Publisher | : Cambridge University Press |
| Total Pages | : 471 |
| Release | : 2015-09-10 |
| Genre | : Mathematics |
| ISBN | : 1316352390 |
Many key phenomena in physics and engineering are described as singularities in the solutions to the differential equations describing them. Examples covered thoroughly in this book include the formation of drops and bubbles, the propagation of a crack and the formation of a shock in a gas. Aimed at a broad audience, this book provides the mathematical tools for understanding singularities and explains the many common features in their mathematical structure. Part I introduces the main concepts and techniques, using the most elementary mathematics possible so that it can be followed by readers with only a general background in differential equations. Parts II and III require more specialised methods of partial differential equations, complex analysis and asymptotic techniques. The book may be used for advanced fluid mechanics courses and as a complement to a general course on applied partial differential equations.
| Author | : Shuxing Chen |
| Publisher | : World Scientific |
| Total Pages | : 207 |
| Release | : 2011 |
| Genre | : Mathematics |
| ISBN | : 9814304832 |
The book provides a comprehensive overview on the theory on analysis of singularities for partial differential equations (PDEs). It contains a summarization of the formation, development and main results on this topic. Some of the author's discoveries and original contributions are also included, such as the propagation of singularities of solutions to nonlinear equations, singularity index and formation of shocks.
| Author | : |
| Publisher | : |
| Total Pages | : 25 |
| Release | : 1989 |
| Genre | : |
| ISBN | : |
We review a number of results relating the propagation of singularities for hyperbolic partial differential equations i.e. the persistence, or non-localization, of wave motion with well-posedness for some inverse problems of reflection type, such as arise for instance in seismology and ultrasonics. By far the most complete information is available for layered problems. We show how a simple but refined propagation-of-singularities theorem, with estimates, yields important functional properties of the model-data relationship for such problems, including regularity in various useful coefficient classes, separation of scales ... We explain the essential role of travel time in the study of these problems, and show how its function may be generalized to multidimensional (i.e. non-layered) problems.
| Author | : J. Eggers |
| Publisher | : Cambridge University Press |
| Total Pages | : 471 |
| Release | : 2015-09-10 |
| Genre | : Mathematics |
| ISBN | : 1107098416 |
This book explores a wide range of singular phenomena, providing mathematical tools for understanding them and highlighting their common features.
| Author | : Fritz John |
| Publisher | : American Mathematical Soc. |
| Total Pages | : 74 |
| Release | : 1990-07-01 |
| Genre | : Mathematics |
| ISBN | : 0821870017 |
This is the second volume in the University Lecture Series, designed to make more widely available some of the outstanding lectures presented in various institutions around the country. Each year at Lehigh University, a distinguished mathematical scientist presents the Pitcher Lectures in the Mathematical Sciences. This volume contains the Pitcher lectures presented by Fritz John in April 1989. The lectures deal with existence in the large of solutions of initial value problems for nonlinear hyperbolic partial differential equations. As is typical with nonlinear problems, there are many results and few general conclusions in this extensive subject, so the author restricts himself to a small portion of the field, in which it is possible to discern some general patterns. Presenting an exposition of recent research in this area, the author examines the way in which solutions can, even with small and very smooth initial data, ``blow up'' after a finite time. For various types of quasi-linear equations, this time depends strongly on the number of dimensions and the ``size'' of the data. Of particular interest is the formation of singularities for nonlinear wave equations in three space dimensions.
| Author | : Arabindo Das |
| Publisher | : |
| Total Pages | : 69 |
| Release | : 1984 |
| Genre | : |
| ISBN | : |
| Author | : Tran Duc Van |
| Publisher | : CRC Press |
| Total Pages | : 256 |
| Release | : 1999-06-25 |
| Genre | : Mathematics |
| ISBN | : 9781584880165 |
Despite decades of research and progress in the theory of generalized solutions to first-order nonlinear partial differential equations, a gap between the local and the global theories remains: The Cauchy characteristic method yields the local theory of classical solutions. Historically, the global theory has principally depended on the vanishing viscosity method. The authors of this volume help bridge the gap between the local and global theories by using the characteristic method as a basis for setting a theoretical framework for the study of global generalized solutions. That is, they extend the smooth solutions obtained by the characteristic method. The authors offer material previously unpublished in book form, including treatments of the life span of classical solutions, the construction of singularities of generalized solutions, new existence and uniqueness theorems on minimax solutions, differential inequalities of Haar type and their application to the uniqueness of global, semi-classical solutions, and Hopf-type explicit formulas for global solutions. These subjects yield interesting relations between purely mathematical theory and the applications of first-order nonlinear PDEs. The Characteristic Method and Its Generalizations for First-Order Nonlinear Partial Differential Equations represents a comprehensive exposition of the authors' works over the last decade. The book is self-contained and assumes only basic measure theory, topology, and ordinary differential equations as prerequisites. With its innovative approach, new results, and many applications, it will prove valuable to mathematicians, physicists, and engineers and especially interesting to researchers in nonlinear PDEs, differential inequalities, multivalued analysis, differential games, and related topics in applied analysis.
