TY  - BOOK
AU  - Alʹshin,A.B.
AU  - Korpusov,M.O.
AU  - Sveshnikov,A.G.
TI  - Blow up in nonlinear Sobolev type equations
T2  - De Gruyter series in nonlinear analysis and applications
SN  - 9783110255294
AV  - QA378 .A47 2011eb
U1  - 515/.782 22
PY  - 2011///
CY  - Berlin, New York
PB  - De Gruyter
KW  - Initial value problems
KW  - Numerical solutions
KW  - Nonlinear difference equations
KW  - Mathematical physics
KW  - Problèmes aux valeurs initiales
KW  - Solutions numériques
KW  - Équations aux différences non linéaires
KW  - Physique mathématique
KW  - MATHEMATICS
KW  - Functional Analysis
KW  - bisacsh
KW  - fast
KW  - Pseudoparabolische Differentialgleichung
KW  - gnd
KW  - Cauchy-Anfangswertproblem
KW  - Lösung
KW  - Mathematik
KW  - Anfangsrandwertproblem
KW  - Blowing up
KW  - Electronic books
N1  - Includes bibliographical references (pages 621-646) and index; Frontmatter --; Preface --; Contents --; Chapter 0 Introduction --; Chapter 1 Nonlinear model equations of Sobolev type --; Chapter 2 Blow-up of solutions of nonlinear equations of Sobolev type --; Chapter 3 Blow-up of solutions of strongly nonlinear Sobolev-type wave equations and equations with linear dissipation --; Chapter 4 Blow-up of solutions of strongly nonlinear, dissipative wave Sobolev-type equations with sources --; Chapter 5 Special problems for nonlinear equations of Sobolev type --; Chapter 6 Numerical methods of solution of initial-boundary-value problems for Sobolev-type equations --; Appendix A Some facts of functional analysis --; Appendix B To Chapter 6 --; Bibliography --; Index
N2  - The monograph is devoted to the study of initial-boundary-value problems for multi-dimensional Sobolev-type equations over bounded domains. The authors consider both specific initial-boundary-value problems and abstract Cauchy problems for first-order (in the time variable) differential equations with nonlinear operator coefficients with respect to spatial variables. The main aim of the monograph is to obtain sufficient conditions for global (in time) solvability, to obtain sufficient conditions for blow-up of solutions at finite time, and to derive upper and lower estimates for the blow-up time. The monograph contains a vast list of references (440 items) and gives an overall view of the contemporary state-of-the-art of the mathematical modeling of various important problems arising in physics. Since the list of references contains many papers which have been published previously only in Russian research journals, it may also serve as a guide to the Russian literature
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ER  -