Boundary Value Problems And Integral Equations In Nonsmooth Domains
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Author | : Martin Costabel |
Publisher | : CRC Press |
Total Pages | : 320 |
Release | : 1994-10-25 |
Genre | : Mathematics |
ISBN | : 9780824793203 |
Based on the International Conference on Boundary Value Problems and lntegral Equations In Nonsmooth Domains held recently in Luminy, France, this work contains strongly interrelated, refereed papers that detail the latest findings in the fields of nonsmooth domains and corner singularities. Two-dimensional polygonal or Lipschitz domains, three-dimensional polyhedral corners and edges, and conical points in any dimension are examined.
Author | : Martin Costabel |
Publisher | : |
Total Pages | : 298 |
Release | : 1995 |
Genre | : |
ISBN | : |
Author | : Guo Chun Wen |
Publisher | : World Scientific |
Total Pages | : 338 |
Release | : 2000-02-22 |
Genre | : Science |
ISBN | : 981454311X |
In this proceedings volume, the following topics are discussed: (1) various boundary value problems for partial differential equations and functional equations, including free and moving boundary problems; (2) the theory and methods of integral equations and integral operators, including singular integral equations; (3) applications of boundary value problems and integral equations to mechanics and physics; (4) numerical methods of integral equations and boundary value problems; and (5) some problems related with analysis and the foregoing subjects.
Author | : William Charles Hector McLean |
Publisher | : Cambridge University Press |
Total Pages | : 376 |
Release | : 2000-01-28 |
Genre | : Mathematics |
ISBN | : 9780521663755 |
This 2000 book provided the first detailed exposition of the mathematical theory of boundary integral equations of the first kind on non-smooth domains.
Author | : F. D. Gakhov |
Publisher | : Courier Corporation |
Total Pages | : 596 |
Release | : 1990-01-01 |
Genre | : Mathematics |
ISBN | : 9780486662756 |
A brilliant monograph, directed to graduate and advanced-undergraduate students, on the theory of boundary value problems for analytic functions and its applications to the solution of singular integral equations with Cauchy and Hilbert kernels. With exercises.
Author | : Michail Borsuk |
Publisher | : Elsevier |
Total Pages | : 538 |
Release | : 2006-01-12 |
Genre | : Mathematics |
ISBN | : 0080461735 |
The book contains a systematic treatment of the qualitative theory of elliptic boundary value problems for linear and quasilinear second order equations in non-smooth domains. The authors concentrate on the following fundamental results: sharp estimates for strong and weak solutions, solvability of the boundary value problems, regularity assertions for solutions near singular points. Key features: * New the Hardy – Friedrichs – Wirtinger type inequalities as well as new integral inequalities related to the Cauchy problem for a differential equation.* Precise exponents of the solution decreasing rate near boundary singular points and best possible conditions for this.* The question about the influence of the coefficients smoothness on the regularity of solutions.* New existence theorems for the Dirichlet problem for linear and quasilinear equations in domains with conical points.* The precise power modulus of continuity at singular boundary point for solutions of the Dirichlet, mixed and the Robin problems.* The behaviour of weak solutions near conical point for the Dirichlet problem for m – Laplacian.* The behaviour of weak solutions near a boundary edge for the Dirichlet and mixed problem for elliptic quasilinear equations with triple degeneration. * Precise exponents of the solution decreasing rate near boundary singular points and best possible conditions for this.* The question about the influence of the coefficients smoothness on the regularity of solutions.* New existence theorems for the Dirichlet problem for linear and quasilinear equations in domains with conical points.* The precise power modulus of continuity at singular boundary point for solutions of the Dirichlet, mixed and the Robin problems.* The behaviour of weak solutions near conical point for the Dirichlet problem for m - Laplacian.* The behaviour of weak solutions near a boundary edge for the Dirichlet and mixed problem for elliptic quasilinear equations with triple degeneration.
Author | : Andreĭ Vasilʹevich Bit︠s︡adze |
Publisher | : |
Total Pages | : 218 |
Release | : 1968 |
Genre | : Mathematics |
ISBN | : |
Author | : Guo Chun Wen |
Publisher | : World Scientific |
Total Pages | : 436 |
Release | : 2010-12-21 |
Genre | : Mathematics |
ISBN | : 981451831X |
In this volume, we report new results about various boundary value problems for partial differential equations and functional equations, theory and methods of integral equations and integral operators including singular integral equations, applications of boundary value problems and integral equations to mechanics and physics, numerical methods of integral equations and boundary value problems, theory and methods for inverse problems of mathematical physics, Clifford analysis and related problems.Contributors include: L Baratchart, B L Chen, D C Chen, S S Ding, K Q Lan, A Farajzadeh, M G Fei, T Kosztolowicz, A Makin, T Qian, J M Rassias, J Ryan, C-Q Ru, P Schiavone, P Wang, Q S Zhang, X Y Zhang, S Y Du, H Y Gao, X Li, Y Y Qiao, G C Wen, Z T Zhang, etc.
Author | : Pierre Grisvard |
Publisher | : |
Total Pages | : 350 |
Release | : 1980 |
Genre | : Boundary value problems |
ISBN | : |
Author | : V. Vasil'ev |
Publisher | : Springer Science & Business Media |
Total Pages | : 184 |
Release | : 2013-03-09 |
Genre | : Mathematics |
ISBN | : 9401594481 |
To summarize briefly, this book is devoted to an exposition of the foundations of pseudo differential equations theory in non-smooth domains. The elements of such a theory already exist in the literature and can be found in such papers and monographs as [90,95,96,109,115,131,132,134,135,136,146, 163,165,169,170,182,184,214-218]. In this book, we will employ a theory that is based on quite different principles than those used previously. However, precisely one of the standard principles is left without change, the "freezing of coefficients" principle. The first main difference in our exposition begins at the point when the "model problem" appears. Such a model problem for differential equations and differential boundary conditions was first studied in a fundamental paper of V. A. Kondrat'ev [134]. Here also the second main difference appears, in that we consider an already given boundary value problem. In some transformations this boundary value problem was reduced to a boundary value problem with a parameter . -\ in a domain with smooth boundary, followed by application of the earlier results of M. S. Agranovich and M. I. Vishik. In this context some operator-function R('-\) appears, and its poles prevent invertibility; iffor differential operators the function is a polynomial on A, then for pseudo differential operators this dependence on . -\ cannot be defined. Ongoing investigations of different model problems are being carried out with approximately this plan, both for differential and pseudodifferential boundary value problems.