Geometric Nonlinear Functional Analysis: 1

The book presents a systematic and unified study of geometric nonlinear functional analysis. This area has its classical roots in the beginning of the twentieth century and is now a very active research area, having close connections to geometric measure theory, probability, classical analysis, comb

This book provides a survey of recent developments in the field of non-linear analysis and the geometry of mappings. Sobolev mappings, quasiconformal mappings, or deformations, between subsets of Euclidean space, or manifolds or more general geometric objects may arise as the solutions to certain op

- Gives background for the solution of nonlinear equations in Banach spaces - Contains basic techniques in nonlinear analysis and touches some perimeters of present day research - Deals with recent topics like measures of non-compactness, topological degr

<DIV><DIV><DIV>This graduate-level text offers a survey of the main ideas, concepts, and methods that constitute nonlinear functional analysis. It features extensive commentary, many examples, and interesting, challenging exercises. Topics include degree mappings for infinite dimensional spaces, the