Slow translational instabilities of spike patterns in the one-dimensional Gray-Scott model

Abstract: Slow translational instabilities of symmetric k-spike equilibria for the one-dimensional singularly perturbed two-component Gray-Scott (GS) model are analyzed. These symmetric spike patterns are characterized by a common value of the spike amplitude. The GS model is studied on a finite interval in the semi-strong spike-interaction regime, where the diffusion coefficient of only one of the two chemical species is asymptotically small. Two distinguished limits for the GS model are considered: the low feed-rate r… Show more

“…For the one-spike case k = 1, (4.37) reduces to the problem (A.10) for the small eigenvalue of a one-spike solution in the intermediate regime. Therefore, Principal Result A.4, established in [21], also applies to the stability of a one-spike solution in the pulse-splitting regime.…”

“…In Section 4 we use an asymptotic matching analysis to analyze the stability of k-spike equilibria for A = O(1) and εA/ √ D 1 with respect to the drift instabilities associated with eigenvalues of order λ = O(ε). This stability analysis is significantly more intricate than that studied in [21] for the drift instability a one-spike solution in the intermediate regime.…”

“…Related results for a one-spike solution for the infinite-line problem were given in [29]. Regarding the small eigenvalues of order λ = O(ε 2 ), it was shown in [21] that k-spike equilibria in the intermediate regime are all stable with respect to this class of eigenvalues when τ = O(1). However, in Section 5 of [21], it was shown that a small eigenvalue can become unstable, leading to a drift instability of a one-spike solution, when τ is asymptotically large as ε → 0.…”

“…Regarding the small eigenvalues of order λ = O(ε 2 ), it was shown in [21] that k-spike equilibria in the intermediate regime are all stable with respect to this class of eigenvalues when τ = O(1). However, in Section 5 of [21], it was shown that a small eigenvalue can become unstable, leading to a drift instability of a one-spike solution, when τ is asymptotically large as ε → 0. This drift instability for the finite-domain problem, which results from a Hopf bifurcation, leads to an oscillatory behavior for the spike-layer location.…”

“…In [20] a rigorous stability analysis of these solutions with respect to the large eigenvalues of order λ = O(1) in the spectrum of the linearization showed that the stability properties depend intricately on A, D, τ, and k. Related work in the low feed-rate regime for a one-spike solution for the infinite-line problem was given in [29]. For the low feed-rate regime, the stability of k-spike equilibria with respect to the small eigenvalues of order λ = O(ε 2 ) in the spectrum of the linearization was studied in [21].…”

The existence and stability of spike equilibria in the one-dimensional Gray–Scott model: The pulse-splitting regime

“…For the one-spike case k = 1, (4.37) reduces to the problem (A.10) for the small eigenvalue of a one-spike solution in the intermediate regime. Therefore, Principal Result A.4, established in [21], also applies to the stability of a one-spike solution in the pulse-splitting regime.…”

“…In Section 4 we use an asymptotic matching analysis to analyze the stability of k-spike equilibria for A = O(1) and εA/ √ D 1 with respect to the drift instabilities associated with eigenvalues of order λ = O(ε). This stability analysis is significantly more intricate than that studied in [21] for the drift instability a one-spike solution in the intermediate regime.…”

“…Related results for a one-spike solution for the infinite-line problem were given in [29]. Regarding the small eigenvalues of order λ = O(ε 2 ), it was shown in [21] that k-spike equilibria in the intermediate regime are all stable with respect to this class of eigenvalues when τ = O(1). However, in Section 5 of [21], it was shown that a small eigenvalue can become unstable, leading to a drift instability of a one-spike solution, when τ is asymptotically large as ε → 0.…”

“…Regarding the small eigenvalues of order λ = O(ε 2 ), it was shown in [21] that k-spike equilibria in the intermediate regime are all stable with respect to this class of eigenvalues when τ = O(1). However, in Section 5 of [21], it was shown that a small eigenvalue can become unstable, leading to a drift instability of a one-spike solution, when τ is asymptotically large as ε → 0. This drift instability for the finite-domain problem, which results from a Hopf bifurcation, leads to an oscillatory behavior for the spike-layer location.…”

“…In [20] a rigorous stability analysis of these solutions with respect to the large eigenvalues of order λ = O(1) in the spectrum of the linearization showed that the stability properties depend intricately on A, D, τ, and k. Related work in the low feed-rate regime for a one-spike solution for the infinite-line problem was given in [29]. For the low feed-rate regime, the stability of k-spike equilibria with respect to the small eigenvalues of order λ = O(ε 2 ) in the spectrum of the linearization was studied in [21].…”

The existence and stability of spike equilibria in the one-dimensional Gray–Scott model: The pulse-splitting regime

Oscillatory Motions of Multiple Spikes in Three-Component Reaction–Diffusion Systems

Discontinuous stationary solutions to certain reaction-diffusion systems