Geometry and integrability / edited by Lionel Mason and Yavuz Nutku.

Title from publisher's bibliographic system (viewed on 05 Oct 2015).

Introduction / Lionel Mason -- Differential equations featuring many periodic solutions / F. Calogero -- Geometry and integrability / R.Y. Donagi -- The anti self-dual Yang-Mills equations and their reductions / Lionel Mason -- Curvature and integrability for Bianchi-type IX metrics / K.P. Tod -- Twistor theory for integrable equations / N.M.J. Woodhouse -- Nonlinear equations and the d-bar problem / P. Santini.

Most integrable systems owe their origin to problems in geometry and they are best understood in a geometrical context. This is especially true today when the heroic days of KdV-type integrability are over. Problems that can be solved using the inverse scattering transformation have reached the point of diminishing returns. Two major techniques have emerged for dealing with multi-dimensional integrable systems: twistor theory and the d-bar method, both of which form the subject of this book. It is intended to be an introduction, though by no means an elementary one, to current research on integrable systems in the framework of differential geometry and algebraic geometry. This book arose from a seminar, held at the Feza Gursey Institute, to introduce advanced graduate students to this area of research. The articles are all written by leading researchers and are designed to introduce the reader to contemporary research topics.