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Partial Differential Equations VI - Elliptic and Parabolic Operators (Hardcover, 1994 ed.): Yu.V. Egorov Partial Differential Equations VI - Elliptic and Parabolic Operators (Hardcover, 1994 ed.)
Yu.V. Egorov; Translated by M. Capinski; Contributions by M.S. Agranovich, S.D. Ejdel'man; Edited by M.A. Shubin; Translated by …
R2,982 Discovery Miles 29 820 Ships in 10 - 15 working days

0. 1. The Scope of the Paper. This article is mainly devoted to the oper ators indicated in the title. More specifically, we consider elliptic differential and pseudodifferential operators with infinitely smooth symbols on infinitely smooth closed manifolds, i. e. compact manifolds without boundary. We also touch upon some variants of the theory of elliptic operators in Rn. A separate article (Agranovich 1993) will be devoted to elliptic boundary problems for elliptic partial differential equations and systems. We now list the main topics discussed in the article. First of all, we ex pound theorems on Fredholm property of elliptic operators, on smoothness of solutions of elliptic equations, and, in the case of ellipticity with a parame ter, on their unique solvability. A parametrix for an elliptic operator A (and A-). . J) is constructed by means of the calculus of pseudodifferential also for operators in Rn, which is first outlined in a simple case with uniform in x estimates of the symbols. As functional spaces we mainly use Sobolev - 2 spaces. We consider functions of elliptic operators and in more detail some simple functions and the properties of their kernels. This forms a foundation to discuss spectral properties of elliptic operators which we try to do in maxi mal generality, i. e., in general, without assuming selfadjointness. This requires presenting some notions and theorems of the theory of nonselfadjoint linear operators in abstract Hilbert space."

Partial Differential Equations VII - Spectral Theory of Differential Operators (Hardcover, 1994 ed.): M.A. Shubin Partial Differential Equations VII - Spectral Theory of Differential Operators (Hardcover, 1994 ed.)
M.A. Shubin; Translated by Tomasz Zastawniak; Contributions by G. V. Rozenblum, M.A. Shubin, M.Z. Solomyak
R2,949 Discovery Miles 29 490 Ships in 10 - 15 working days

This EMS volume contains a survey of the principles and advanced techniques of the spectral theory of linear differential and pseudodifferential operators in finite-dimensional spaces. Also including a special section of Sunada's recent solution of Kac's celebrated problem of whether or not "one can hear the shape of a drum."

Partial Differential Equations IV - Microlocal Analysis and Hyperbolic Equations (Hardcover, 1993 ed.): P.C. Sinha Partial Differential Equations IV - Microlocal Analysis and Hyperbolic Equations (Hardcover, 1993 ed.)
P.C. Sinha; Edited by Yu.V. Egorov; Contributions by Yu.V. Egorov, V.Ya. Ivrii; Edited by M.A. Shubin
R2,933 Discovery Miles 29 330 Ships in 10 - 15 working days

In the first part of this EMS volume Yu.V. Egorov gives an account of microlocal analysis as a tool for investigating partial differential equations. This method has become increasingly important in the theory of Hamiltonian systems. Egorov discusses the evolution of singularities of a partial differential equation and covers topics like integral curves of Hamiltonian systems, pseudodifferential equations and canonical transformations, subelliptic operators and Poisson brackets. The second survey written by V.Ya. Ivrii treats linear hyperbolic equations and systems. The author states necessary and sufficient conditions for C?- and L2 -well-posedness and he studies the analogous problem in the context of Gevrey classes. He also gives the latest results in the theory of mixed problems for hyperbolic operators and a list of unsolved problems. Both parts cover recent research in an important field, which before was scattered in numerous journals. The book will hence be of immense value to graduate students and researchers in partial differential equations and theoretical physics.

Partial Differential Equations IX - Elliptic Boundary Value Problems (Hardcover, 1997 ed.): M.S. Agranovich Partial Differential Equations IX - Elliptic Boundary Value Problems (Hardcover, 1997 ed.)
M.S. Agranovich; Contributions by E.M. Shargorodsky; Edited by M.S. Agranovich; Translated by A.V. Brenner; Edited by Yuri Egorov; Translated by …
R2,957 Discovery Miles 29 570 Ships in 10 - 15 working days

This EMS volume gives an overview of the modern theory of elliptic boundary value problems, with contributions focusing on differential elliptic boundary problems and their spectral properties, elliptic pseudodifferential operators, and general differential elliptic boundary value problems in domains with singularities.

Partial Differential Equations II - Elements of the Modern Theory. Equations with Constant Coefficients (Hardcover, 1994 ed.):... Partial Differential Equations II - Elements of the Modern Theory. Equations with Constant Coefficients (Hardcover, 1994 ed.)
Yu.V. Egorov; Edited by Yu.V. Egorov; Translated by P.C. Sinha; A.I. Komech; Edited by M.A. Shubin; …
R2,947 Discovery Miles 29 470 Ships in 10 - 15 working days

This book, the first printing of which was published as Volume 31 of the Encyclopaedia of Mathematical Sciences, contains a survey of the modern theory of general linear partial differential equations and a detailed review of equations with constant coefficients. Readers will be interested in an introduction to microlocal analysis and its applications including singular integral operators, pseudodifferential operators, Fourier integral operators and wavefronts, a survey of the most important results about the mixed problem for hyperbolic equations, a review of asymptotic methods including short wave asymptotics, the Maslov canonical operator and spectral asymptotics, a detailed description of the applications of distribution theory to partial differential equations with constant coefficients including numerous interesting special topics.

Partial Differential Equations III - The Cauchy Problem: Qualitative Theory of Partial Differential Equations (Hardcover):... Partial Differential Equations III - The Cauchy Problem: Qualitative Theory of Partial Differential Equations (Hardcover)
Yu.V. Egorov, M.A. Shubin; Translated by M. Grinfeld
R2,401 Discovery Miles 24 010 Ships in 12 - 17 working days

Two general questions regarding partial differential equations are explored in detail in this volume of the Encyclopaedia. The first is the Cauchy problem, and its attendant question of well-posedness (or correctness). The authors address this question in the context of PDEs with constant coefficients and more general convolution equations in the first two chapters. The third chapter extends a number of these results to equations with variable coefficients. The second topic is the qualitative theory of second order linear PDEs, in particular, elliptic and parabolic equations. Thus, the second part of the book is primarily a look at the behavior of solutions of these equations. There are versions of the maximum principle, the Phragmen-Lindel]f theorem and Harnack's inequality discussed for both elliptic and parabolic equations. The book is intended for readers who are already familiar with the basic material in the theory of partial differential equations.

Partial Differential Equations III - The Cauchy Problem. Qualitative Theory of Partial Differential Equations (Paperback,... Partial Differential Equations III - The Cauchy Problem. Qualitative Theory of Partial Differential Equations (Paperback, Softcover reprint of the original 1st ed. 1991)
S. G. Gindikin; Edited by Youri Egorov; Translated by M. Grinfeld; Contributions by V.A. Kondrat'ev; Edited by M.A. Shubin; Contributions by …
R1,445 Discovery Miles 14 450 Ships in 10 - 15 working days

,h In the XIX century, mathematical physics continued to be the main source of new partial differential equations and ofproblems involving them. The study ofLaplace's equation and ofthe wave equation had assumed a more systematic nature. In the beginning of the century, Fourier added the heat equation to the aforementioned two. Marvellous progress in obtaining precise solution repre- sentation formulas is connected with Poisson, who obtained formulas for the solution of the Dirichlet problem in a disc, for the solution of the Cauchy problems for the heat equation, and for the three-dimensional wave equation. The physical setting ofthe problem led to the gradual replacement ofthe search for a general solution by the study of boundary value problems, which arose naturallyfrom the physics ofthe problem. Among these, theCauchy problem was of utmost importance. Only in the context of first order equations, the original quest for general integralsjustified itself. Here again the first steps are connected with the names of D'Alembert and Euler; the theory was being intensively 1h developed all through the XIX century, and was brought to an astounding completeness through the efforts ofHamilton, Jacobi, Frobenius, and E. Cartan. In terms of concrete equations, the studies in general rarely concerned equa- tions of higher than second order, and at most in three variables. Classification 'h ofsecond orderequations was undertaken in the second halfofthe XIX century (by Du Bois-Raymond). An increase in the number of variables was not sanc- tioned by applications, and led to the little understood ultra-hyperbolic case.

Partial Differential Equations VIII - Overdetermined Systems Dissipative Singular Schroedinger Operator Index Theory... Partial Differential Equations VIII - Overdetermined Systems Dissipative Singular Schroedinger Operator Index Theory (Paperback, Softcover reprint of the original 1st ed. 1996)
M.A. Shubin; Translated by C. Constanda; Contributions by P. I. Dudnikov, B.V. Fedosov, B.S. Pavlov, …
R2,541 Discovery Miles 25 410 Ships in 10 - 15 working days

Consider a linear partial differential operator A that maps a vector-valued function Y = (Yl,"" Ym) into a vector-valued function I = (h, ..., II). We assume at first that all the functions, as well as the coefficients of the differen tial operator, are defined in an open domain Jl in the n-dimensional Euclidean n space IR, and that they are smooth (infinitely differentiable). A is called an overdetermined operator if there is a non-zero differential operator A' such that the composition A' A is the zero operator (and underdetermined if there is a non-zero operator A" such that AA" = 0). If A is overdetermined, then A'I = 0 is a necessary condition for the solvability of the system Ay = I with an unknown vector-valued function y. 3 A simple example in 1R is the operator grad, which maps a scalar func tion Y into the vector-valued function (8y/8x , 8y/8x2, 8y/8x3)' A necessary solvability condition for the system grad y = I has the form curl I = O."

Partial Differential Equations IV - Microlocal Analysis and Hyperbolic Equations (Paperback, Softcover reprint of hardcover 1st... Partial Differential Equations IV - Microlocal Analysis and Hyperbolic Equations (Paperback, Softcover reprint of hardcover 1st ed. 1993)
P.C. Sinha; Edited by Yu.V. Egorov; Contributions by Yu.V. Egorov, V.Ya. Ivrii; Edited by M.A. Shubin
R2,789 Discovery Miles 27 890 Ships in 10 - 15 working days

In the first part of this EMS volume Yu.V. Egorov gives an account of microlocal analysis as a tool for investigating partial differential equations. This method has become increasingly important in the theory of Hamiltonian systems. Egorov discusses the evolution of singularities of a partial differential equation and covers topics like integral curves of Hamiltonian systems, pseudodifferential equations and canonical transformations, subelliptic operators and Poisson brackets. The second survey written by V.Ya. Ivrii treats linear hyperbolic equations and systems. The author states necessary and sufficient conditions for C?- and L2 -well-posedness and he studies the analogous problem in the context of Gevrey classes. He also gives the latest results in the theory of mixed problems for hyperbolic operators and a list of unsolved problems. Both parts cover recent research in an important field, which before was scattered in numerous journals. The book will hence be of immense value to graduate students and researchers in partial differential equations and theoretical physics.

Partial Differential Equations VI - Elliptic and Parabolic Operators (Paperback, Softcover reprint of hardcover 1st ed. 1994):... Partial Differential Equations VI - Elliptic and Parabolic Operators (Paperback, Softcover reprint of hardcover 1st ed. 1994)
Yu.V. Egorov; Translated by M. Capinski; Contributions by M.S. Agranovich, S.D. Ejdel'man; Edited by M.A. Shubin; Translated by …
R2,802 Discovery Miles 28 020 Ships in 10 - 15 working days

Authored by well-known researchers, this book presents its material as accessible surveys, giving readers access to comprehensive coverage of results scattered throughout the literature. A unique source of information for graduate students and researchers in mathematics and theoretical physics, and engineers interested in the subject.

Partial Differential Equations VII - Spectral Theory of Differential Operators (Paperback, Softcover reprint of hardcover 1st... Partial Differential Equations VII - Spectral Theory of Differential Operators (Paperback, Softcover reprint of hardcover 1st ed. 1994)
M.A. Shubin; Translated by T. Zastawniak; Contributions by G. V. Rozenblum, M.A. Shubin, M.Z. Solomyak
R2,789 Discovery Miles 27 890 Ships in 10 - 15 working days

This EMS volume contains a survey of the principles and advanced techniques of the spectral theory of linear differential and pseudodifferential operators in finite-dimensional spaces. Also including a special section of Sunada's recent solution of Kac's celebrated problem of whether or not "one can hear the shape of a drum."

Partial Differential Equations IX - Elliptic Boundary Value Problems (Paperback, Softcover reprint of hardcover 1st ed. 1997):... Partial Differential Equations IX - Elliptic Boundary Value Problems (Paperback, Softcover reprint of hardcover 1st ed. 1997)
M.S. Agranovich; Contributions by E.M. Shargorodsky; Edited by M.S. Agranovich; Translated by A.V. Brenner; Edited by Yuri Egorov; Translated by …
R2,789 Discovery Miles 27 890 Ships in 10 - 15 working days

This EMS volume gives an overview of the modern theory of elliptic boundary value problems, with contributions focusing on differential elliptic boundary problems and their spectral properties, elliptic pseudodifferential operators, and general differential elliptic boundary value problems in domains with singularities.

Pseudodifferential Operators and Spectral Theory (Paperback, 2nd ed. 2001): M.A. Shubin Pseudodifferential Operators and Spectral Theory (Paperback, 2nd ed. 2001)
M.A. Shubin; Translated by S.I. Andersson
R3,266 Discovery Miles 32 660 Ships in 10 - 15 working days

This is the second edition of Shubin's classical book. It provides an introduction to the theory of pseudodifferential operators and Fourier integral operators from the very basics. The applications discussed include complex powers of elliptic operators, Hörmander asymptotics of the spectral function and eigenvalues, and methods of approximate spectral projection. Exercises and problems are included to help the reader master the essential techniques. The book is written for a wide audience of mathematicians, be they interested students or researchers.

Partial Differential Equations II - Elements of the Modern Theory. Equations with Constant Coefficients (Paperback, Softcover... Partial Differential Equations II - Elements of the Modern Theory. Equations with Constant Coefficients (Paperback, Softcover reprint of the original 1st ed. 1994)
Yu.V. Egorov; Edited by Yu.V. Egorov; Translated by P.C. Sinha; A.I. Komech; Edited by M.A. Shubin; …
R2,784 Discovery Miles 27 840 Ships in 10 - 15 working days

This book, the first printing of which was published as Volume 31 of the Encyclopaedia of Mathematical Sciences, contains a survey of the modern theory of general linear partial differential equations and a detailed review of equations with constant coefficients. Readers will be interested in an introduction to microlocal analysis and its applications including singular integral operators, pseudodifferential operators, Fourier integral operators and wavefronts, a survey of the most important results about the mixed problem for hyperbolic equations, a review of asymptotic methods including short wave asymptotics, the Maslov canonical operator and spectral asymptotics, a detailed description of the applications of distribution theory to partial differential equations with constant coefficients including numerous interesting special topics.

Foundations of the Classical Theory of Partial Differential Equations (Paperback, Softcover reprint of the original 1st ed.... Foundations of the Classical Theory of Partial Differential Equations (Paperback, Softcover reprint of the original 1st ed. 1998)
Yu.V. Egorov; Translated by R. Cooke; Edited by Yu.V. Egorov; M.A. Shubin; Edited by M.A. Shubin
R1,549 Discovery Miles 15 490 Ships in 10 - 15 working days

From the reviews: ..".I think the volume is a great success ... a welcome addition to the literature ..." The Mathematical Intelligencer, 1993
..". According to the authors ... the work was written for the nonspecialists and physicists but in my opinion almost every specialist will find something new for herself/himself in the text. ..." Acta Scientiarum Mathematicarum, 1993
..". On the whole, a thorough overview on the classical aspects of the topic may be gained from that volume." Monatshefte fur Mathematik, 1993
..". It is comparable in scope with the great Courant-Hilbert Methods of Mathematical Physics, but it is much shorter, more up to date of course, and contains more elaborate analytical machinery...." The Mathematical Gazette, 1993"

Differential Equations, Partial, v. 1 - Foundations of the Classical Theory (Hardcover): M.A. Shubin, IU.V.Egorov Differential Equations, Partial, v. 1 - Foundations of the Classical Theory (Hardcover)
M.A. Shubin, IU.V.Egorov; Translated by R. Cooke
R2,545 Discovery Miles 25 450 Out of stock

Partial differential equations are as old as calculus itself, occurring as examples in the papers of Newton and Leibniz. Since the beginning, they have been strongly linked to physics and other sciences. This volume presents an introduction to the classical theory, emphasizing along the way physical methods and physical interpretations. The book beings with a derivation of some of the classical partial differential equations, and a discussion of the limitations of the physical models upon which the derivations are based. The second chapter discusses the classical methods for studying PDEs, including the theory of distributions and the Petrovskij classification into elliptic, parabolic and hyperbolic equations. Among the more advanced methods discussed are spectral theory, the method of planar waves and the theory of semigroups. Every topic considered is placed in its present context in mathematical research, yet the book never loses sight of the non-specialist reader with an interest in physical applications.

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