Differential calculus and equations

This volume consists of papers written by eminent scientists from the international mathematical community, who present the latest information concerning the problem of Plateau after its classical solution by Jesse Douglas and Tibor Rado.

Ordinary differential equations (ODEs), differential-algebraic equations (DAEs) and partial differential equations (PDEs) are among the forms of mathematics most widely used in science and engineering.

This book is intended as a survey of latest results on weighted inequalities in Lorentz, Orlicz spaces and Zygmund classes.

This book is devoted to the possible applications of spectral analysis and spectral synthesis for convolution type functional equations on topological abelian groups.

This book presents new results in the theory of the double Mellin-Barnes integrals popularly known as the general H-function of two variables.

This book consists of papers written by outstanding mathematicians.

This book is intended to give a survey of the whole field of nonlinear dynamics (or "e;chaos theory"e;) in compressed form.

The book is devoted to new and classical results of the theory of linear partial differential operators in Gevrey spaces.

With an addendum by Wu Congxin (Harbin Institute of Technology)Linear Functional Analysis resulted from a series of lectures Orlicz gave in Beijing, China, 1958.

In this book, expansions of functions in infinite series and infinite product and the asymptotic expansion of functions are discussed.

This book introduces the general aspects of hyperbolic conservation laws and their numerical approximation using some of the most modern tools: spectral methods, unstructured meshes and I -formulation.

This book presents in a clear and systematic manner the general theory of normal families, quasi-normal families and Qm-normal families of meromorphic functions, and various applications.

This book deals with the global qualitative behavior of flows and diffeomorphisms.

The book is devoted to boundary value problems for general partial differential equations.

The invertible point transformation is a powerful tool in the study of nonlinear differential and difference equations.

This book is adapted and revised from the author's seminal PhD thesis, in which two forms of asymptotically universal structure were presented and explained for area-preserving maps.

This book emphasizes the interdisciplinary interaction in problems involving geometry and partial differential equations.

This book is devoted to impulsive differential equations with a small parameter.

This book deals with the investigation of global attractors of nonlinear dynamical systems.

This book introduces the real variable theory of HP spaces briefly and concentrates on its applications to various aspects of analysis fields.

This problem book contains exercises for courses in differential equations and calculus of variations at universities and technical institutes.

This book deals with the theory and some applications of integral transforms that involve integration with respect to an index or parameter of a special function of hypergeometric type as the kernel (index transforms).

The splitting extrapolation method is a newly developed technique for solving multidimensional mathematical problems.

The book collects original articles on numerical analysis of ordinary differential equations and its applications.

This is probably the first book dedicated to this topic.

Nonsmooth optimization covers the minimization or maximization of functions which do not have the differentiability properties required by classical methods.

This book deals with a series of topics on the cutting edge of nonlinear science, striking a balance between theory and experiment.

The book presents the methods of analysis of dynamical mechanical systems subjected to stochastic excitations in form of random trains of impulses.

This book provides a concise presentation of the major techniques for determining analytic approximations to the solutions of planar oscillatory dynamic systems.

Psychophysics is by definition mappings between events in the environment and levels of human sensory responses.

A combinatorial method is developed in this book to explore the mysteries of chaos, which has became a topic of science since 1975.

Functional differential equations have received attention since the 1920's.

This book is devoted to the theory of infinite-order linear and nonlinear differential operators with several real arguments and their applications to problems of partial differential equations and numerical analysis.

This book is essentially devoted to complex properties (Phase plane structure and bifurcations) of two-dimensional noninvertible maps, i.

This book surveys some topics in the rapidly developing areas of regular and singular boundary value problems.

The main purpose of this book is to provide a self-contained, complete and geometrically clear presentation of the recent results on global controllability and stabilization.

The question of the presence of various asymptotic properties of the solutions of ordinary differential equations arises when solving various practical problems.

This book recounts the connections between multidimensional hypergeometric functions and representation theory.

This book introduces a rapidly growing new research area - the study of dynamical properties of elementary fields.

This book deals systematically with the mathematical theory of plane elasto-statics by using complex variable methods, together with many results originated by the author.

Dynamical bifurcation theory is concerned with the changes that occur in the global structure of dynamical systems as parameters are varied.

In recent years there appeared a large number of papers as well as chapters in more general monographs devoted to evolution equations containing small (or large) parameters.

This book provides an elementary introduction to the classical analysis on normed spaces, paying special attention to nonlinear topics such as fixed points, calculus and ordinary differential equations.

This volume presents the theory of partial differential equations (PDEs) from a modern geometric point of view so that PDEs can be characterized by using either technique of differential geometry or algebraic geometry.

This book develops methods which explore some new interconnections and interrelations between Analysis and Topology and their applications.

This volume consists of six articles covering different facets of the mathematical theory of dynamical systems.

This book is an introduction to mathematical analysis (i.

These notes present a theorem on infinite matrices with values in a topological group due to P Antosik and J Mikusinski.

The goal of this book is to investigate further the interdisciplinary interaction between Mathematical Analysis and Topology.