Classical and quantum nonlinear integrable systems: theory and applications

Covering both classical and quantum models, nonlinear integrable systems are of considerable theoretical and practical interest, with applications over a wide range of topics, including water waves, pin models, nonlinear optics, correlated electron systems, plasma physics, and reaction-diffusion pro

Covering both classical and quantum models, nonlinear integrable systems are of considerable theoretical and practical interest, with applications over a wide range of topics, including water waves, pin models, nonlinear optics, correlated electron systems, plasma physics, and reaction-diffusion pro

<p>In recent times it has been stated that many dynamical systems of classical mathematical physics and mechanics are endowed with symplectic structures, given in the majority of cases by Poisson brackets. Very often such Poisson structures on corresponding manifolds are canonical, which gives rise

<p><p>Here, the authors present modern methods of analysis for nonlinear systems which may occur in fields such as physics, chemistry, biology, or economics. They concentrate on the following topics, specific for such systems:</p><p>(a) constructive existence results and regularity theorems for all

Preface; Scope; Contents; Audience; Acknowledgements; Contents; Introduction: Special Classes of Extended Phase Spaces of Distributions; Sums and Intersections of Banach Spaces; Gelfand Triple; Special Classes of Bochner Integrable Functions; Generalized Derivatives; Extended Phase Spaces; Reference