New frontiers in the mathematics of solids
Lead Research Organisation:
University of Oxford
Department Name: Mathematical Institute
Abstract
Solid mechanics is the study of how solids deform under the action of applied forces or displacements, changes of temperature and other factors. The central model is that of elasticity theory, in which the stress (the force per unit area acting across internal surfaces in the material) is a prescribed function of the strain, while various modifications to this theory enable other effects, such as plastic flow and damage, to be described.The governing equations of solid mechanics are highly nonlinear systems of partial differential equations, the mathematical properties of which, such as when solutions exist and how they depend on important parameters, are poorly understood.The aim of the proposal is to conduct a broadly based programme of research on the mathematics of solid mechanics and computation of solutions, concentrating on three important areas of applications.The first area concerns the formation of patterns of microstructure in alloys, arising from phase transformations in which the underlying crystal lattice undergoes a change of shape (for example, from cubic to tetragonal) at a critical temperature. These patterns are of importance for determining the everyday properties of the material. Our research will attempt for the first time to describe mathematically how these patterns form.The second area is fracture mechanics, which is the study of when and how materials crack and break. This is a large scientific field of great technological importance. Our research will focus on potentially exciting new mathematical models of fracture, which do not make guesses as to the position and form of new fracture surfaces, and which allow effective numerical computation of these surfaces.The third area concerns applications of solid mechanics to medicine. Mechanics is becoming increasingly important for the understanding of many parts of the human body. We will study models of how bone and tissue grow, with applications to tumours and in particular colon cancer, and how the detection of breast tumours can be aided by observing changes in the elastic properties of the breast.This programme will involve close collaboration with experimentalists, microscopists and medical researchers, but at the same time it will draw on and attempt to deepen our mathematical understanding of the underlying equations, which are common to all the applications. It will involve combining skills in modelling (for example, how the models are related to atomic or cellular interactions), in mathematical analysis of the equations, in devising effective computational algorithms, and in interacting with those wanting to use the results (engineers, materials scientists, and doctors).
Organisations
Publications
Angela Mihai L
(2013)
Numerical simulation of shear and the Poynting effects by the finite element method: An application of the generalised empirical inequalities in non-linear elasticity
in International Journal of Non-Linear Mechanics
Ball J
(2013)
Nucleation of austenite in mechanically stabilized martensite by localized heating
in Journal of Alloys and Compounds
Ball J
(2015)
Incompatible Sets of Gradients and Metastability
in Archive for Rational Mechanics and Analysis
Ball J
(2014)
Quasistatic Nonlinear Viscoelasticity and Gradient Flows
in Journal of Dynamics and Differential Equations
Bernabeu MO
(2009)
CHASTE: incorporating a novel multi-scale spatial and temporal algorithm into a large-scale open source library.
in Philosophical transactions. Series A, Mathematical, physical, and engineering sciences
Bernabeu MO
(2010)
Stimulus protocol determines the most computationally efficient preconditioner for the bidomain equations.
in IEEE transactions on bio-medical engineering
Berrone S
(2007)
Two-sided a posteriori error bounds for incompressible quasi-Newtonian flows
in IMA Journal of Numerical Analysis
Chapman S
(2016)
Homogenization of a Row of Dislocation Dipoles from Discrete Dislocation Dynamics
in SIAM Journal on Applied Mathematics
Description | The objectives of the project were to undertake a broad programme of interdisciplinary research in solid mechanics, covering theoretical issues such as whether the governing equations have solutions, and whether these solutions have singularities (such as cracks, dislocations and phase boundaries), and questions associated with the development of new algorithms for the numerical simulation of these. An important aim was to train a new generation of mathematicians, working at the interface of mathematical modelling, applied and numerical analysis, and materials science, who could effectively interact and collaborate with materials scientists, engineers and biologists. Advances were made in all these areas. |
Exploitation Route | Through publications, personal consultation with the PIs and former members, and through ongoing research activities (see, for example, the Oxford Solid Mechanics Initiative http://solids.maths.ox.ac.uk/ and the PIRE network http://www.math.cmu.edu/PIRE/). |
Sectors | Aerospace Defence and Marine Construction Healthcare Manufacturing including Industrial Biotechology Pharmaceuticals and Medical Biotechnology |
URL | http://www2.maths.ox.ac.uk/oxmos/ |
Description | Yes. For example, the work on the discovery of ultra low hysteresis materials by the research group of R. D. James (University of Minnesota), and more recently by the groups of Quandt and Wuttig was partly an outgrowth of the research activities. These have yet to be exploited commercially but the promise is evident. |
First Year Of Impact | 2013 |
Description | Advanced Investigator Grant |
Amount | € 2,006,998 (EUR) |
Funding ID | 291053 |
Organisation | European Research Council (ERC) |
Sector | Public |
Country | Belgium |
Start | 03/2012 |
End | 03/2017 |