# Analysis of Nonlinear Partial Differential Equations

Lead Research Organisation: University of Oxford
Department Name: Mathematical Institute

### Abstract

Partial differential equations (PDEs) are equations that relate the partial derivatives, usually with respect to space and time coordinates, of unknown quantities. They are ubiquitous in almost all applications of mathematics, where they provide a natural mathematical description of phenomena in the physical, natural and social sciences, often arising from fundamental conservation laws such as for mass, momentum and energy. Significant application areas include geophysics, the bio-sciences, engineering, materials science, physics and chemistry, economics and finance. Length-scales of natural phenomena modelled by PDEs range from sub-atomic to astronomical, and time-scales may range from nanoseconds to millennia. The behaviour of every material object can be modelled either by PDEs, usually at various different length- or time-scales, or by other equations for which similar techniques of analysis and computation apply. A striking example of such an object is Planet Earth itself.Linear PDEs are ones for which linear combinations of solutions are also solutions. For example, the linear wave equation models electromagnetic waves, which can be decomposed into sums of elementary waves of different frequencies, each of these elementary waves also being solutions. However, most of the PDEs that accurately model nature are nonlinear and, in general, there is no way of writing their solutions explicitly. Indeed, whether the equations have solutions, what their properties are, and how they may be computed numerically are difficult questions that can be approached only by methods of mathematical analysis. These involve, among other things, precisely specifying what is meant by a solution and the classes of functions in which solutions are sought, and establishing ways in which approximate solutions can be constructed which can be rigorously shown to converge to actual solutions. The analysis of nonlinear PDEs is thus a crucial ingredient in the understanding of the world about us.As recognized by the recent International Review of Mathematics, the analysis of nonlinear PDEs is an area of mathematics in which the UK, despite some notable experts, lags significantly behind our scientific competitors, both in quantity and overall quality. This has a serious detrimental effect on mathematics as a whole, on the scientific and other disciplines which depend on an understanding of PDEs, and on the knowledge-based economy, which in particular makes increasing use of simulations of PDEs instead of more costly or impractical alternatives such as laboratory testing.The proposal responds to the national need in this crucial research area through the formation of a forward-looking world-class research centre in Oxford, in order to provide a sharper focus for fundamental research in the field in the UK and raise the potential of its successful and durable impact within and outside mathematics. The centre will involve the whole UK research community having interests in nonlinear PDEs, for example through the formation of a national steering committee that will organize nationwide activities such as conferences and workshops.Oxford is an ideal location for such a research centre on account of an existing nucleus of high quality researchers in the field, and very strong research groups both in related areas of mathematics and across the range of disciplines that depend on the understanding of nonlinear PDEs. In addition, two-way knowledge transfer with industry will be achieved using the expertise and facilities of the internationally renowned mathematical modelling group based in OCIAM which, through successful Study Groups with Industry, has a track-record of forging strong links to numerous branches of science, industry, engineering and commerce. The university is committed to the formation of the centre and will provide a significant financial contribution, in particular upgrading one of the EPSRC-funded lectureships to a Chair

### Publications

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Varvaruca E (2012) Equivalence of weak formulations of the steady water waves equations. in Philosophical transactions. Series A, Mathematical, physical, and engineering sciences

Torres M (2011) On the structure of solutions of nonlinear hyperbolic systems of conservation laws in Communications on Pure and Applied Analysis

Soneji P (2014) Relaxation in BV of integrals with superlinear growth in ESAIM: Control, Optimisation and Calculus of Variations

Serra Cassano F (2015) Intrinsic Lipschitz graphs in Heisenberg groups and continuous solutions of a balance equation in Annales de l'Institut Henri Poincaré C, Analyse non linéaire

Schwab C (2008) Sparse finite element approximation of high-dimensional transport-dominated diffusion problems in ESAIM: Mathematical Modelling and Numerical Analysis

Rindler F (2009) Optimal Control for Nonconvex Rate-Independent Evolution Processes in SIAM Journal on Control and Optimization

Peschka D (2009) Thin-film rupture for large slip in Journal of Engineering Mathematics

Paicu M (2011) Energy Dissipation and Regularity for a Coupled Navier-Stokes and Q-Tensor System in Archive for Rational Mechanics and Analysis

Paicu M (2011) Global Existence and Regularity for the Full Coupled Navier-Stokes and Q -Tensor System in SIAM Journal on Mathematical Analysis

Ortner C (2008) Analysis of a quasicontinuum method in one dimension in ESAIM: Mathematical Modelling and Numerical Analysis

Ortner C (2011) Stress-based atomistic/continuum coupling: a new variant of the quasicontinuum approximation in International Journal for Multiscale Computational Engineering

Niethammer B (2010) A rigorous derivation of mean-field models for diblock copolymer melts in Calculus of Variations and Partial Differential Equations

Niethammer B (2011) Optimal Bounds for Self-Similar Solutions to Coagulation Equations with Product Kernel in Communications in Partial Differential Equations

Niethammer B (2007) On Screening Induced Fluctuations in Ostwald Ripening in Journal of Statistical Physics

Nguyen L (2012) Refined approximation for minimizers of a Landau-de Gennes energy functional in Calculus of Variations and Partial Differential Equations

NEGRI M (2011) QUASI-STATIC CRACK PROPAGATION BY GRIFFITH'S CRITERION in Mathematical Models and Methods in Applied Sciences

Napoli A (2014) On the validity of the Euler-Lagrange system in Communications on Pure and Applied Analysis

Mielke A (2014) An Approach to Nonlinear Viscoelasticity via Metric Gradient Flows in SIAM Journal on Mathematical Analysis

Mielke A (2009) Reverse Approximation of Energetic Solutions to Rate-Independent Processes in Nonlinear Differential Equations and Applications NoDEA

Menon G (2010) Dynamics and self-similarity in min-driven clustering in Transactions of the American Mathematical Society

Melcher C (2010) Thin-Film Limits for Landau-Lifshitz-Gilbert Equations in SIAM Journal on Mathematical Analysis

Melcher C (2008) Direct approach to L p estimates in homogenization theory in Annali di Matematica Pura ed Applicata

Makridakis C (2012) Finite Element Analysis of Cauchy-Born Approximations to Atomistic Models in Archive for Rational Mechanics and Analysis

Majumdar A (2009) Landau-De Gennes Theory of Nematic Liquid Crystals: the Oseen-Frank Limit and Beyond in Archive for Rational Mechanics and Analysis

Luskin M (2009) An Analysis of Node-Based Cluster Summation Rules in the Quasicontinuum Method in SIAM Journal on Numerical Analysis

LARSEN C (2012) EXISTENCE OF SOLUTIONS TO A REGULARIZED MODEL OF DYNAMIC FRACTURE in Mathematical Models and Methods in Applied Sciences

LANGWALLNER B (2011) EXISTENCE AND CONVERGENCE RESULTS FOR THE GALERKIN APPROXIMATION OF AN ELECTRONIC DENSITY FUNCTIONAL in Mathematical Models and Methods in Applied Sciences

Kurzke M (2009) Dynamics for Ginzburg-Landau vortices under a mixed flow in Indiana University Mathematics Journal

Kristensen J (2008) Regularity in oscillatory nonlinear elliptic systems in Mathematische Zeitschrift

Kristensen J (2009) Relaxation of signed integral functionals in BV in Calculus of Variations and Partial Differential Equations

Kristensen J (2010) Boundary Regularity in Variational Problems in Archive for Rational Mechanics and Analysis

Kristensen J (2008) Boundary regularity of minima in Rendiconti Lincei - Matematica e Applicazioni

Kristensen J (2010) Characterization of Generalized Gradient Young Measures Generated by Sequences in W1,1 and BV in Archive for Rational Mechanics and Analysis

Knezevic D (2008) Spectral Galerkin approximation of Fokker-Planck equations with unbounded drift in ESAIM: Mathematical Modelling and Numerical Analysis

Knezevic D (2009) A heterogeneous alternating-direction method for a micro-macro dilute polymeric fluid model in ESAIM: Mathematical Modelling and Numerical Analysis

Kirchheim B (2011) Automatic convexity of rank-1 convex functions in Comptes Rendus Mathematique

Jones GW (2010) Modelling apical constriction in epithelia using elastic shell theory. in Biomechanics and modeling in mechanobiology

Description This was a broad grant designed to help consolidate research on nonlinear partial differential equations in the UK. In particular the Oxford Centre for Nonlinear PDE was founded as a result of the grant and is now a leading international centre. As regards specific research advances, these were in various areas of applications of PDE, for example to fluid and solid mechnaics, liquid crystals, electromagnetism, and relativity.
Exploitation Route Through publications and consultation with current and former members of OxPDE.
Sectors Aerospace, Defence and Marine,Chemicals,Construction,Electronics,Energy,Environment

URL https://www0.maths.ox.ac.uk/groups/oxpde