OxPDE Lunchtime Seminar
|
Wed, 18/04/2012 12:30 |
Beixiang Fang (Shanghai JiaoTong University - OxPDE visitor) |
OxPDE Lunchtime Seminar  |
Gibson 1st Floor SR |
| In this talk I will discuss the refraction of shocks on the interface for 2-d steady compressible flow. Particularly, the class of E-H type regular refraction is defined and its global stability of the wave structure is verified. The 2-d steady potential flow equations is employed to describe the motion of the fluid. The stability problem of the E-H type regular refraction can be reduced to a free boundary problem of nonlinear mixed type equations in an unbounded domain. The corresponding linearized problem has similarities to a generalized Tricomi problem of the linear Lavrentiev-Bitsadze mixed type equation, and it can be reduced to a nonlocal boundary value problem of an elliptic system. The later is finally solved by establishing the bijection of the corresponding nonlocal operator in a weighted Hölder space via careful harmonic analysis. This is a joint work with CHEN Shuxing and HU Dian. | |||
|
Thu, 03/05/2012 12:30 |
Beatrice Pelloni (University of Reading) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
| In this talk I will survey the results on the existence of solutions of the semigeostrophic system, a fully nonlinear reduction of the Navier-Stokes equation that constitute a valid model when the effect of rotation dominate the atmospheric flow. I will give an account of the theory developed since the pioneering work of Brenier in the early 90's, to more recent results obtained in a joint work with Mike Cullen and David Gilbert. | |||
|
Wed, 09/05/2012 12:30 |
Apala Majumdar (OCCAM) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
| In this talk, we make quantitative comparisons between two widely-used liquid crystal modelling approaches - the continuum Landau-de Gennes theory and mesoscopic mean-field theories, such as the Maier-Saupe and Onsager theories. We use maximum principle arguments for elliptic partial differential equations to compute explicit bounds for the norm of static equilibria within the Landau-de Gennes framework. These bounds yield an explicit prescription of the temperature regime within which the LdG and the mean-field predictions are consistent, for both spatially homogeneous and inhomogeneous systems. We find that the Landau-de Gennes theory can make physically unrealistic predictions in the low-temperature regime. In my joint work with John Ball, we formulate a new theory that interpolates between mean-field and continuum approaches and remedies the deficiencies of the Landau-de Gennes theory in the low-temperature regime. In particular, we define a new thermotropic potential that blows up whenever the mean-field constraints are violated. The main novelty of this work is the incorporation of spatial inhomogeneities (outside the scope of mean-field theory) along with retention of mean-field level information. | |||
|
Thu, 17/05/2012 12:30 |
Gianluca Crippa (Universität Basel) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
|
In this seminar I will present two results regarding the uniqueness (and further properties) for the two-dimensional continuity equation
and the ordinary differential equation in the case when the vector field is bounded, divergence free and satisfies additional conditions on its distributional curl. Such settings appear in a very natural way in various situations, for instance when considering two-dimensional incompressible fluids. I will in particular describe the following two cases: (1) The vector field is time-independent and its curl is a (locally finite) measure (without any sign condition). (2) The vector field is time-dependent and its curl belongs to L^1. Based on joint works with: Giovanni Alberti (Universita' di Pisa), Stefano Bianchini (SISSA Trieste), Francois Bouchut (CNRS & Universite' Paris-Est-Marne-la-Vallee) and Camillo De Lellis (Universitaet Zuerich). |
|||
|
Thu, 24/05/2012 12:30 |
Mikhail Feldman (University of Wisconsin) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
| We discuss shock reflection problem for compressible gas dynamics, and von Neumann conjectures on transition between regular and Mach reflections. Then we will talk about some recent results on existence, regularity and geometric properties of regular reflection solutions for potential flow equation. In particular, we discuss optimal regularity of solutions near sonic curve, and stability of the normal reflection soluiton. Open problems will also be discussed. The talk will be based on the joint work with Gui-Qiang Chen, and with Myoungjean Bae. | |||
|
Thu, 31/05/2012 12:30 |
Isaac Vikram Chenchiah (University of Bristol) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
| We present a variational model for the quasi-static evolution of brutal brittle damage for geometrically-linear elastic materials. We allow for multiple damaged states. Moreover, unlike current formulations, the materials are allowed to be anisotropic and the deformations are not restricted to anti-plane shear. The model can be formulated either energetically or through a strain threshold. We explore the relationship between these formulations. This is joint work with Christopher Larsen, Worcester Polytechnic Institute. | |||
|
Thu, 07/06/2012 12:30 |
Leonid V. Berlyand (Penn State University) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
We study minimizers of the Ginzburg-Landau (GL) functional
 (with no magnetic field). This functional is of fundamental importance in the theory of superconductivity and superuidity; the development of these theories led to three Nobel prizes. For a  domain  with holes we consider “semistiff” boundary conditions: a Dirichlet condition for the modulus  , and a homogeneous Neumann condition for the phase  . The principal
result of this work (with V. Rybalko) is a proof of the existence of stable local minimizers with vortices (global minimizers do not exist). These vortices are novel in that they approach the boundary and have bounded energy as  .
In contrast, in the well-studied Dirichlet (“stiff”) problem for the GL PDE, the vortices remain distant from the boundary and their energy blows up as
 . Also, there are no stable minimizers to the homogeneous Neumann (“soft”) problem with vortices.
Next, we discuss more recent results (with V. Rybalko and O. Misiats) on global minimizers of the full GL functional (with magnetic field) subject to semi-stiff boundary conditions. Here, we show the existence of global minimizers with vortices for both simply and doubly connected domains and describe the location of their vortices. |
|||
![\[E_\epsilon(u):=\frac{1}{2}\int_A |\nabla u|^2 + \frac{1}{4\epsilon^2} \int_A(1-|u|^2)^2\]](/files/tex/bc4923751ffa30a17ea1e1a4a3a365ed0f3efd54.png)
|
Thu, 14/06/2012 12:30 |
Oliver Penrose (Heriot-Watt University) |
OxPDE Lunchtime Seminar |
Gibson 1st Floor SR |
A method of defining non-equilibrium entropy for a chaotic dynamical system is proposed which, unlike the usual method based on Boltzmann's principle  , does not involve the concept of a macroscopic state. The idea is illustrated using an example based on Arnold's `cat' map. The example also demonstrates that it is possible to have irreversible behaviour, involving a large increase of entropy, in a chaotic system with only two degrees of freedom. |
|||
