Add to ORKGWe study the existence of target patterns in oscillatory media with weak local coupling and in the presence of an impurity, or defect. We model these systems using a viscous eikonal equation posed on the plane, and represent the defect as a perturbation. In contrast to previous results we consider large defects, which we describe using a function with slow algebraic decay, i.e., $g \sim {\mathcal O}(1/|x|^m)$ for $m \in (1,2]$. We prove that these defects are able to generate target patterns and that, just as in the case of strongly localized impurities, their frequency is small beyond all orders of the small parameter describing their strength. Our analysis consists of finding two approximations to target pattern solutions, one which is va...
In pattern-forming systems, localized patterns are readily found when stable patterns exist at the s...
The linear stability of steady-state periodic patterns of localized spots in R2 for the two-componen...
AbstractWe consider reaction-diffusion equations of the special type ct = F(c,x) +▽ 2c, with F(c,x) ...
We analyze the effect of adding a weak, localized, inhomogeneity to a two dimensional array of oscil...
University of Minnesota Ph.D. dissertation. June 2015. Major: Mathematics. Advisor: Arnd Scheel. 1 ...
We study the effects of adding a local perturbation in a pattern forming system, taking as an exampl...
We study the effects of adding a local perturbation in a pattern forming system, taking as an exampl...
AbstractWe consider the general reaction-diffusion system At = F(A) + ϵ DM ▽2A + ϵg(→x, A), 0 < ϵ ⪡ ...
In the first part of this thesis, we study the existence and stability of multi-spot patterns on the...
Abstract. Spatially localized, time-periodic structures are common in pattern-forming systems, appea...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
Populations of oscillators that present both local and global coupling can exhibit diffusive instabi...
In this article, a general geometric singular perturbation framework is developed to study the impac...
Large systems of particles interacting pairwise in $d$-dimensions give rise to extraordinarily rich ...
In this paper, we deal with two models for pattern formation in active system on the d-dimensional t...
In pattern-forming systems, localized patterns are readily found when stable patterns exist at the s...
The linear stability of steady-state periodic patterns of localized spots in R2 for the two-componen...
AbstractWe consider reaction-diffusion equations of the special type ct = F(c,x) +▽ 2c, with F(c,x) ...
We analyze the effect of adding a weak, localized, inhomogeneity to a two dimensional array of oscil...
University of Minnesota Ph.D. dissertation. June 2015. Major: Mathematics. Advisor: Arnd Scheel. 1 ...
We study the effects of adding a local perturbation in a pattern forming system, taking as an exampl...
We study the effects of adding a local perturbation in a pattern forming system, taking as an exampl...
AbstractWe consider the general reaction-diffusion system At = F(A) + ϵ DM ▽2A + ϵg(→x, A), 0 < ϵ ⪡ ...
In the first part of this thesis, we study the existence and stability of multi-spot patterns on the...
Abstract. Spatially localized, time-periodic structures are common in pattern-forming systems, appea...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
Populations of oscillators that present both local and global coupling can exhibit diffusive instabi...
In this article, a general geometric singular perturbation framework is developed to study the impac...
Large systems of particles interacting pairwise in $d$-dimensions give rise to extraordinarily rich ...
In this paper, we deal with two models for pattern formation in active system on the d-dimensional t...
In pattern-forming systems, localized patterns are readily found when stable patterns exist at the s...
The linear stability of steady-state periodic patterns of localized spots in R2 for the two-componen...
AbstractWe consider reaction-diffusion equations of the special type ct = F(c,x) +▽ 2c, with F(c,x) ...