Instability Thresholds and Dynamics of Mesa Patterns in Reaction-Diffusion Systems

McKay, Rebecca Charlotte

19 August 2011

We consider reaction-diffusion systems of two variables with Neumann boundary conditions on a finite interval with diffusion rates of different orders. Solutions of these systems can exhibit a variety of patterns and behaviours; one common type is called a mesa pattern; these are solutions that in the spatial domain exhibit highly localized interfaces connected by almost constant regions. The main focus of this thesis is to examine three different mechanisms by which the mesa patterns become unstable. These patterns can become unstable due to the effect of the heterogeneity of the domain, through an oscillatory instability, or through a coarsening effect from the exponentially small interaction with the boundary. We compute instability thresholds such that, as the larger diffusion coefficient is increased past this threshold, the mesa pattern transitions from stable to unstable. As well, the dynamics of the interfaces making up these mesa patterns are determined. This allows us to describe the mechanism leading up to the instabilities as well as what occurs past the instability threshold. For the oscillatory solutions, we determine the amplitude of the oscillations. For the coarsening behaviour, we determine the motion of the interfaces away from the steady state. These calculations are accomplished by using the methods of formal asymptotics and are verified by comparison with numerical computations. Excellent agreement between the asymptotic and the numerical results is found.

reaction-diffusion systems

pdes

asymptotic analysis

Electromagnetic scattering using the integral equation-asymptotic phase method

Aberegg, Keith R.

12 1900

No description available.

Integral equations

Integral equations Asymptotic theory

Taškinių procesų lokalus asimptotinis normalumas / The local asymptotic normality of pointed processes

Tarasova, Darja

02 July 2012

Darbe nagrinėjami taškiniai procesai (nehomogeninis Puasono procesas ir atstatymo procesas), randamos bendrosios sąlygos, kad būtų patenkintas lokalus asimptotinis normalumas. / The purpose of this work is to determine general conditions for local asymptotic normality to be assured.The point processes (renewal process and non-homogenous Poisson process) and their properties are examined in the first part of work. Then the conditions for the local asymptotic normality have been investigated. In the second part of work it is shown how these conditions are satisfied in the cases of the renewal process and non-homogenous Poisson process.

Mathematics

Lokalus

Asimptotinis

Normalumas

Local

Asymptotic

Normality

Mathematical modelling of modulated-temperature differential scanning calorimetry

Nikolopoulos, Christos

January 1997

No description available.

510

Free convection in fluid-saturated porous media

Banu, Nurzahan

January 2000

No description available.

536.7

Elliptic perturbations of dynamical systems with a proper node

Sultanov, Oskar, Kalyakin, Leonid, Tarkhanov, Nikolai

January 2014

The paper is devoted to asymptotic analysis of the Dirichlet problem for a second order partial differential equation containing a small parameter multiplying the highest order derivatives. It corresponds to a small perturbation of a dynamical system having a stationary solution in the domain. We focus on the case where the trajectories of the system go into the domain and the stationary solution is a proper node.

dynamical system

singular perturbation

asymptotic methods

Mathematics

Test of independence of subvectors in multivariate analysis

Khan, Nazeer.

January 1984

No description available.

Multivariate analysis.

Independence (Mathematics)

Asymptotic expansions.

Asymptotics of higher-order Painlevé equations

Morrison, Tegan Ann

January 2009

Doctor of Philosophy (PhD) / We undertake an asymptotic study of a second Painlevé hierarchy based on the Jimbo-Miwa Lax pair in the limit as the independent variable approaches infinity. The hierarchy is defined by an infinite sequence of non-linear ordinary differential equations, indexed by order, with the classical second Painlevé equation as the first member. We investigate general and special asymptotic behaviours admitted by each equation in the hierarchy. We show that the general asymptotic behaviour is described by two related hyperelliptic functions, where the genus of the functions increases with each member of the hierarchy, and we prove that there exist special families of solutions which are represented by algebraic formal power series. For specific values of the constants which appear in the higher-order second Painlevé equations, exact solutions are also constructed. Particular attention is given to the fourth-order analogue of the classical second Painlevé equation. In this case, the general asymptotic behaviour is given to leading-order by two related genus-2 hyperelliptic functions. These functions are characterised by four complex parameters which depend on the independent variable through the perturbation terms of the leading-order equations, and we investigate how these parameters change with respect to this variable. We also show that the fourth-order equation admits two classes of algebraic formal power series and that there exist families of true solutions with these behaviours in specified sectors of the complex plane, as well as unique solutions in extended sectors. To complement our asymptotic study of higher-order Painlevé equations, we consider a new setting in which classical Painlevé equations arise. We study reaction-diffusion equations with quadratic and cubic source terms, with a spatio-temporal dependence included in those terms, and show that solutions of these equations are given by first and second Painlevé transcendents.

Painlevé equations

Asymptotic analysis

ODE theory

A nonlinear theory for thin aerofoils with non-thin trailing edges /

Moriarty, Julie Ann.

January 1987

Thesis (Ph. D.)--University of Adelaide, Dept. of Applied Mathematics, 1988. / Includes bibliographical references (leaves 44-45).

Asymptotic properties of the Buckley-James estimator for a bivariate interval censorship regression model

Chen, Cuixian.

January 2007

Thesis (Ph. D.)--State University of New York at Binghamton, Mathematical Sciences Department or Field of Study, 2007. / Includes bibliographical references.