New types of parabolic equations of high order considered in the Clifford analysis framework
Pluri-Beltrami and plurigeneralized Beltrami equations for ellpitic and hyperbolic cases
Boundary and initial value problems solved in quadratures
New types of parabolic equations of high order considered in the Clifford analysis framework
Pluri-Beltrami and plurigeneralized Beltrami equations for ellpitic and hyperbolic cases
Boundary and initial value problems solved in quadratures
Parabolic equations in this framework have been largely ignored and are the primary focus of this work.; This book will appeal to mathematicians and physicists in PDEs who are interested in boundary and initial value problems, and may be used as a supplementary text by graduate students.|The most important thing is to write equations in a beautiful form and their success in applications is ensured. Paul Dirac The uniqueness and existence theorems for the solutions of boundary and initial value problems for systems of high-order partial differential equations (PDE) are sufficiently well known. In this book, the problems considered are those whose solutions can be represented in quadratures, i.e., in an effective form. Such problems have remarkable applications in mathematical physics, the mechanics of deformable bodies, electro magnetism, relativistic quantum mechanics, and some of their natural generalizations. Almost all such problems can be set in the context of Clifford analysis. Moreover, they can be obtained without applying any physical laws, a circumstance that gives rise to the idea that Clifford analysis itself can suggest generalizations of classical equations or new equations altogether that may have some physical content. For that reason, Clifford analysis represents one of the most remarkable fields in modem mathematics as well as in modem physics.|This monograph is devoted to new types of higher order PDEs in the framework of Clifford analysis. While elliptic and hyperbolic equations have been studied in the Clifford analysis setting in book and journal literature, parabolic equations have been ignored and are the primary focus of this work. These new equations have remarkable applications to mathematical physics---mechanics of deformable bodies, electromagnetic fields, quantum mechanics. Book will appeal to mathematicians and physicists in PDEs, and it may also be used as a supplementary text by graduate students.
Introduction * Part I: Boundary Value Problems for Regular, Generalized, Regular and Pluriregular Elliptic Equations * Two Dimensional Cases * Multi-Dimensional Cases * Part II: Initial Value Problems for Regular, Pluriregular Hyperbolic and Parabolic Equations * Hyperbolic and Plurihyperbolic Equations in Clifford Analysis * Parabolic and Pluriparabolic Equations in Clifford Analysis * Epilogue * References * Index
The most important thing is to write equations in a beautiful form and their success in applications is ensured. Paul Dirac The uniqueness and existence theorems for the solutions of boundary and initial value problems for systems of high-order partial differential equations (PDE) are sufficiently well known. In this book, the problems considered are those whose solutions can be represented in quadratures, i.e., in an effective form. Such problems have remarkable applications in mathematical physics, the mechanics of deformable bodies, electro magnetism, relativistic quantum mechanics, and some of their natural generalizations. Almost all such problems can be set in the context of Clifford analysis. Moreover, they can be obtained without applying any physical laws, a circumstance that gives rise to the idea that Clifford analysis itself can suggest generalizations of classical equations or new equations altogether that may have some physical content. For that reason, Clifford analysis represents one of the most remarkable fields in modem mathematics as well as in modem physics.
I Boundary Value Problems for Regular, Generalized Regular and Pluriregular Elliptic Equations.- I Two-Dimensional Cases.- II Multidimensional Cases.- II Initial Value Problems for Regular and Pluriregular, Hyperbolic and Parabolic Equations.- III Hyperbolic and Plurihyperbolic Equations in Clifford Analysis.- IV Parabolic and Pluriparabolic Equations in Clifford Analysis.- Epilogue.- References.
Inhaltsverzeichnis
Introduction * Part I: Boundary Value Problems for Regular, Generalized, Regular and Pluriregular Elliptic Equations * Two Dimensional Cases * Multi-Dimensional Cases * Part II: Initial Value Problems for Regular, Pluriregular Hyperbolic and Parabolic Equations * Hyperbolic and Plurihyperbolic Equations in Clifford Analysis * Parabolic and Pluriparabolic Equations in Clifford Analysis * Epilogue * References * Index
Klappentext
The most important thing is to write equations in a beautiful form and their success in applications is ensured. Paul Dirac The uniqueness and existence theorems for the solutions of boundary and initial value problems for systems of high-order partial differential equations (PDE) are sufficiently well known. In this book, the problems considered are those whose solutions can be represented in quadratures, i.e., in an effective form. Such problems have remarkable applications in mathematical physics, the mechanics of deformable bodies, electro magnetism, relativistic quantum mechanics, and some of their natural generalizations. Almost all such problems can be set in the context of Clifford analysis. Moreover, they can be obtained without applying any physical laws, a circumstance that gives rise to the idea that Clifford analysis itself can suggest generalizations of classical equations or new equations altogether that may have some physical content. For that reason, Clifford analysis represents one of the most remarkable fields in modem mathematics as well as in modem physics.
This monograph is devoted to new types of higher order PDEs in the framework of Clifford analysis. While elliptic and hyperbolic equations have been studied in the Clifford analysis setting in book and journal literature, parabolic equations have been ignored and are the primary focus of this work. These new equations have remarkable applications to mathematical physics---mechanics of deformable bodies, electromagnetic fields, quantum mechanics. Book will appeal to mathematicians and physicists in PDEs, and it may also be used as a supplementary text by graduate students.