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Trends in Evolution Equation Research

Editat de Gaston M. N'Guerekata
en Limba Engleză Hardback – 18 mai 2008
This book presents, recent and important research from around the world on the theory and methods of linear or non-linear evolution equations as well as their further applications. Equations dealing with the asymptotic behaviour of solutions to evolution equations are included. This book also covers degenerate parabolic equations, abstract differential equations, comments on the Schrodinger equation, solutions in banach spaces, periodic and quasi-periodic solutions, concave Lagragian systems and integral equations.
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Specificații

ISBN-13: 9781604562705
ISBN-10: 1604562706
Pagini: 186
Ilustrații: illustrations
Dimensiuni: 180 x 260 x 19 mm
Greutate: 0.57 kg
Ediția:New.
Editura: Nova Science Publishers Inc

Cuprins

Preface; An Asymptotic Model of a Nonlinear Kelvin-Voigt Viscoelastic Plate; Mathematical Analysis of a Bilateral Obstacle Problem for a Class of Second-Order Operators; Application of the Picard Operators to Second Order ODE's; Doubly Non-linear Degenerate Parabolic Equations on Carnot Groups; Some Scalar Conservation Laws with Discontinuous Flux; Delayed Diffusion Equation: A New Exact Solution to the Delayed Diffusion Equation; Level Sets For Reaction Diffusion Equations; On the Almost Periodicity of the Superposition of Functions; Time Periodic Solutions for Quasigeostrophic Motion and Their Stability; Jacobian Feedback Loops Analysis II: Stability and Instability; Existence of Oscillating Solution for Non-linear State-Dependent Delay Differential Equation; Semilinear Abstract Differential Equations with Deviated Argument; Singular Solutions of a Semi-Linear Elliptic Equation on Nonsmooth Domains; Existence of Weighted Pseudo Almost Periodic Solutions to Some Non-Autonomous Differential Equations; A Krasnoselskii-Type Fixed Point Theorem For Multifunctions Defined on a Hyperconvex Space; Index.