Nonlinear Boundary Value Problems PhD Thesis.
The School of Mathematics has active research programmes in algebra, linear and multilinear algebra, mathematical logic, functional analysis, number theory, combinatorics, graph theory, topological groups, differential operators and partial differential equations (including symmetries and conservation laws). The (National) Centre for Excellence which attracts a large number of experts from.
Nonlinear singular partial differential equations arise naturally when studying models from such areas as Riemannian geometry, applied probability, mathematical physics and biology. The purpose of this thesis is to develop analytical methods to investigate a large class of nonlinear elliptic PDEs underlying models from physical and biological sciences. These methods advance the knowledge of.
Mathematics MSc dissertations. The Department of Mathematics and Statistics was host until 2014 to the MSc course in the Mathematics of Scientific and Industrial Computation (previously known as Numerical Solution of Differential Equations) and the MSc course in Mathematical and Numerical Modelling of the Atmosphere and Oceans.
PhD thesis, University of Glasgow. Full text available as: Preview. Abstract. This research covers three topics: the development of numerical techniques for the solution of partial differential and integral equations; simulations of incompressible viscous flows using these techniques; and their extension to parallel computation of the incompressible N-S equations. Item Type: Thesis (PhD.
Below is a summary of the requirements for the Ph.D. in Mathematics. General requirements for graduate degrees at Rutgers are governed by the rules of the Graduate School - New Brunswick and are listed in the current catalog.These include how and when credit can be transferred and how many credits can be taken each semester.
Find out more about Jitse Niesen, lecturer at the School of Mathematics in the University of Leeds.
This thesis considers algebraic properties of differential equations, and can be divided into two parts. The major distinction among them is that the first part deals with the theory of linear ordinary differential equations, while the second part deals with the nonlinear partial differential equations. In the first part, we present a method to transform the Green's operator into the Green's.