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Dynamics of Nonlinear Differential Equations

$123,499FY2005MPSNSF

Brown University, Providence RI

Investigators

Abstract

DYNAMICS OF NONLINEAR DIFFERENTIAL EQUATIONS (DMS-0500674) John Mallet-Paret Division of Applied Mathematics Brown University We propose to study fundamental qualitative properties of various classes of nonlinear dynamical systems, in particular as they arise from differential and difference equations. The systems to be considered include those from ordinary and partial differential equations, systems of lattice differential equations (that is, spatially discrete systems), differential delay equations, and max-plus operators. Issues such as the existence of equilibria and their stability, spontaneous formation of spatial patterns and spatial chaos, the existence and qualitative properties of traveling fronts, and the appearance of spontaneous temporal oscillations will be studied for these problems. In addition to the established techniques (both theoretical and numerical) from differential equations and dynamical systems, a significant portion of the proposed research involves the development and implementation of new tools and techniques with which to study these systems. Among the techniques to be employed are those involving singular perturbations, invariant manifolds, exponential dichotomies, and topological methods. We are developing new mathematical techniques for analyzing and understanding differential equations and difference equations. Such equations typically arise as models in numerous areas of science. In broad terms, these types of mathematical systems model time-dependent or evolutionary behavior, as it occurs in a wide range of scientific areas, including biology, chemistry, electrical circuit theory, image processing, and material science. Although this is a very broad scope of inquiry, the specific problems to be studied exhibit features in common -- spontaneous formation of patterns, self-sustained oscillations, regulation by internal feedback (often with time delays) -- which can be analyzed with some of the basic tools of dynamical systems theory. It is expected the resulting mathematical advances arising from these studies will increase the knowledge of, and will provide insight into both the abstract theory of dynamical systems, as well as the scientific areas of inquiry.

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