Add to ORKGWe study the effects of adding a local perturbation in a pattern forming system, taking as an example the Ginzburg-Landau equation with a small localized inhomogeneity in two dimensions. Measuring the response through the linearization at a periodic pattern, one finds an unbounded linear operator that is not Fredholm due to continuous spectrum in typical translation invariant or weighted spaces. We show that Kondratiev spaces, which encode algebraic localization that increases with each derivative, provide an effective means to circumvent this difficulty. We establish Fredholm properties in such spaces and use the result to construct deformed periodic patterns using the Implicit Function Theorem. We find a logarithmic phase correction which...
Pattern formation is a subfield of nonlinear dynamics in spatially extended systems. Although the la...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
This dissertation studies nonlinear partial differential equations (PDEs) describing pattern formati...
We study the effects of adding a local perturbation in a pattern forming system, taking as an exampl...
(Communicated by the associate editor name) Abstract. We consider localized perturbations to spatial...
We analyze the effect of adding a weak, localized, inhomogeneity to a two dimensional array of oscil...
We study the existence of target patterns in oscillatory media with weak local coupling and in the p...
University of Minnesota Ph.D. dissertation. June 2015. Major: Mathematics. Advisor: Arnd Scheel. 1 ...
The formation of self-organized patterns and localized states are ubiquitous in Nature. Localized st...
Since the pioneering work of Turing, it has been known that diffusion can destablise a homogeneous s...
Regular spatial structures emerge in a wide range of different dynamics characterized by local and/o...
We analyze spontaneous pattern formation in a continuum model of primary visual cortex that incorpor...
We consider a family of two-dimensional nonlinear area-preserving mappings that generalize the Chiri...
We study singular patterns in a particular system of parabolic partial differential equations which ...
Abstract. Spatially localized, time-periodic structures are common in pattern-forming systems, appea...
Pattern formation is a subfield of nonlinear dynamics in spatially extended systems. Although the la...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
This dissertation studies nonlinear partial differential equations (PDEs) describing pattern formati...
We study the effects of adding a local perturbation in a pattern forming system, taking as an exampl...
(Communicated by the associate editor name) Abstract. We consider localized perturbations to spatial...
We analyze the effect of adding a weak, localized, inhomogeneity to a two dimensional array of oscil...
We study the existence of target patterns in oscillatory media with weak local coupling and in the p...
University of Minnesota Ph.D. dissertation. June 2015. Major: Mathematics. Advisor: Arnd Scheel. 1 ...
The formation of self-organized patterns and localized states are ubiquitous in Nature. Localized st...
Since the pioneering work of Turing, it has been known that diffusion can destablise a homogeneous s...
Regular spatial structures emerge in a wide range of different dynamics characterized by local and/o...
We analyze spontaneous pattern formation in a continuum model of primary visual cortex that incorpor...
We consider a family of two-dimensional nonlinear area-preserving mappings that generalize the Chiri...
We study singular patterns in a particular system of parabolic partial differential equations which ...
Abstract. Spatially localized, time-periodic structures are common in pattern-forming systems, appea...
Pattern formation is a subfield of nonlinear dynamics in spatially extended systems. Although the la...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
This dissertation studies nonlinear partial differential equations (PDEs) describing pattern formati...