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eBook Hyperbolic Boundary Value Problems download

by Reiko Sakamoto

eBook Hyperbolic Boundary Value Problems download ISBN: 0521107598
Author: Reiko Sakamoto
Publisher: Cambridge University Press; 1 edition (February 19, 2009)
Language: English
Pages: 224
ePub: 1883 kb
Fb2: 1893 kb
Rating: 4.1
Other formats: mobi doc lrf txt
Category: Math Sciences
Subcategory: Mathematics

The first initial boundary value problem for hyperbolic systems in infinite nonsmooth .

THE FIRST INITIAL BOUNDARY VALUE PROBLEM FOR HYPERBOLIC SYSTEMS IN INFINITE NONSMOOTH CYLINDERS Hung, N. Kim, B. and Obukhovskii, . Taiwanese Journal of Mathematics, 2011. On a refinement of the regularity theorem for solutions to the characteristic initial boundary value problem for linear symmetric hyperbolic systems Shizuta, Yasushi and Tanaka, Yumi, Proceedings of the Japan Academy, Series A, Mathematical Sciences, 2000.

For an important class of problems, the Lopatinskii determinant vanishes in the hyperbolic region of the frequency domain and nowhere else. In this paper, we give a criterion that ensures that the hyperbolic region coincides with the projection of the forward cone.

Hyperbolic Boundary Value Problems

Hyperbolic Boundary Value Problems. Walmart 9780521107594. In this book, Professor Sakamoto introduces the general theory of the existence and uniqueness of solutions to the wave equation. Boundary value problems are of central importance and interest not only to mathematicians but also to physicists and engineers who need to solve differential equations which govern the behaviour of physical systems. In this book, Professor Sakamoto introd. Cambridge University Press.

Hyperbolic boundary value problems. Indian Institute of Technology, Kanpur. Contributor(s): Miyahara, Katsumi. Material type: BookPublisher: Cambridge University 1982Description: viii,210. Subject(s): Differential Equations, Hyperbdic Boundary Value ProblemsDDC classification: 51. 5 Sa29hE. Tags from this library: No tags from this library for this title. 51. 5 Sa29hE (Browse shelf).

Book Overview In this book, Professor Sakamoto introduces the general theory of the existence and uniqueness of solutions to the wave equation.

Boundary value problems are of central importance and interest not only to mathematicians but also to physicists and engineers who need to solve differential equations which govern the behaviour of physical systems.

Lateral Boundary Hyperbolic Equation Mixed Problem Cauchy Data Fourier Integral Operator. Lagnese, . Boundary value control of a class of hyperbolic equations in a general domain, SIAM J. Control and Optimization 15, (1977) 973–983. These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves. Littman, . Boundary control theory for hyperbolic and parabolic equations with constant coefficients, Annali Sc. N. Sup. Pisa Ser. We give some examples of strictly hyperbolic operators that show that our criterion is.

On closed boundary value problems for equations of mixed elliptic-hyperbolic type. A Boundary-Value Problem for Weakly Nonlinear Hyperbolic Equations with Data on the Entire Boundary of a Domain. Bilusyak N. Ptashnyk B. I. 103 Kb.

A BOUNDARY VALUE PROBLEM IN THE HYPERBOLIC SPACE P. AMSTER, G. KEILHAUER, AND M. C. MARIANI Received 16 December 1999 We consider a nonlinear problem for the mean curvature equation in the hyperbolic space with a Dirichlet boundary data g. We find solutions in a Sobolev space under appropriate conditions on g. 1. Introduction Let M be the open unit ball i. We consider in this paper the Dirichlet problem for a function X : → M which satisfies the equation of prescribed mean curvature ∇Xu Xu + ∇Xv Xv −2H (X)Xu ∧ Xv X g in, on ∂, (. ) where H : M → R is a given continuous function, and g ∈ W 2,p (, R3 ) for 1 <.

Boundary value problems are of central importance and interest not only to mathematicians but also to physicists and engineers who need to solve differential equations which govern the behaviour of physical systems. In this book, Professor Sakamoto introduces the general theory of the existence and uniqueness of solutions to the wave equation. The reader is assumed to have some familiarity with Lebesgue integration and complex function theory but other than that the book is essentially self-contained. It is therefore suited to senior undergraduates and graduates in mathematics and the mathematical sciences but can be read with profit by professionals in those subjects.