The Impact of the Domain Boundary on an Inhibitory System: Existence and Location of a Stationary Half Disc

Abstract: The nonlocal geometric variational problem derived from the Ohta-Kawasaki diblock copolymer theory is an inhibitory system with self-organizing properties. The free energy, defined on subsets of a prescribed measure in a domain, is a sum of a local perimeter functional and a nonlocal energy given by the Green's function of Poisson's equation on the domain with the Neumann boundary condition. The system has the property of preventing a disc from drifting towards the domain boundary. This raises the question of … Show more

“…Note that the second term in 1.10 is twice the fundamental solution of −∆. If ξ * ,b ∈ ∂D is the center of the perturbed half disc stationary set found in [9] and the parameters ω and γ are in the same range as in this paper specified in Theorem 1.1, then ξ * ,b is close to a minimum of the function…”

“…Finding a stationary set whose interface meets the domain boundary is a difficult problem. The first non-trivial result came in our work [9]. When ω is sufficiently small and γ is suitably large, there exists a stationary set shaped like a perturbed half disc, stable in some sense, whose boundary inside D (a perturbed half circle) meets ∂D perpendicularly.…”

“…Here we consider an ideal situation where micro-domains are clearly separated from each other by interfaces with zero width [7,10,4]. Mathematically, let D be a bounded domain in R 2 ; D is assumed to be of class C 5 , a condition necessary for many results in [9]. The energy functional is defined for every Lebesgue measurable subset Ω of D whose Lebesgue measure is fixed at ω|D|:…”

“…Here P D (Ω) is the perimeter of Ω in D. In the case that Ω is piecewise C 1 , it is the length of the part of the boundary of Ω that is inside D. For a general Ω, see [11,9] for the definition of P D (Ω). The part of the boundary of Ω inside D is called the interface of Ω.…”

“…When ω is sufficiently small and γ is suitably large, there exists a stationary set shaped like a perturbed half disc, stable in some sense, whose boundary inside D (a perturbed half circle) meets ∂D perpendicularly. A crucial quantity introduced in [9…”

The impact of the domain boundary on an inhibitory system: Interior discs and boundary half discs

“…Note that the second term in 1.10 is twice the fundamental solution of −∆. If ξ * ,b ∈ ∂D is the center of the perturbed half disc stationary set found in [9] and the parameters ω and γ are in the same range as in this paper specified in Theorem 1.1, then ξ * ,b is close to a minimum of the function…”

“…Finding a stationary set whose interface meets the domain boundary is a difficult problem. The first non-trivial result came in our work [9]. When ω is sufficiently small and γ is suitably large, there exists a stationary set shaped like a perturbed half disc, stable in some sense, whose boundary inside D (a perturbed half circle) meets ∂D perpendicularly.…”

“…Here we consider an ideal situation where micro-domains are clearly separated from each other by interfaces with zero width [7,10,4]. Mathematically, let D be a bounded domain in R 2 ; D is assumed to be of class C 5 , a condition necessary for many results in [9]. The energy functional is defined for every Lebesgue measurable subset Ω of D whose Lebesgue measure is fixed at ω|D|:…”

“…Here P D (Ω) is the perimeter of Ω in D. In the case that Ω is piecewise C 1 , it is the length of the part of the boundary of Ω that is inside D. For a general Ω, see [11,9] for the definition of P D (Ω). The part of the boundary of Ω inside D is called the interface of Ω.…”

“…When ω is sufficiently small and γ is suitably large, there exists a stationary set shaped like a perturbed half disc, stable in some sense, whose boundary inside D (a perturbed half circle) meets ∂D perpendicularly. A crucial quantity introduced in [9…”

The impact of the domain boundary on an inhibitory system: Interior discs and boundary half discs

Disc–Disc Structure in a Two-Species Interacting System on a Flat Torus

Interior and boundary spikes for the two-dimensional Gierer–Meinhardt system