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Stability of spikes in the shadow Gierer-Meinhardt system with Robin boundary conditions.

Abstract:
We consider the shadow system of the Gierer-Meinhardt system in a smooth bounded domain Omega subset R(N),A(t)=epsilon(2)DeltaA-A+A(p)/xi(q),x is element of Omega, t>0, tau/Omega/xi(t)=-/Omega/xi+1/xi(s) integral(Omega)A(r)dx, t>0 with the Robin boundary condition epsilon partial differentialA/partial differentialnu+a(A)A=0, x is element of partial differentialOmega, where a(A)>0, the reaction rates (p,q,r,s) satisfy 10, r>0, s>or=0, 1or=0. We rigorously prove the following results on the stability of one-spike solutions: (i) If r=2 and 11 and tau sufficiently small the interior spike is stable. (ii) For N=1 if r=2 and 11 such that for a is element of (a(0),1) and mu=2q/(s+1)(p-1) is element of (1,mu(0)) the near-boundary spike solution is unstable. This instability is not present for the Neumann boundary condition but only arises for the Robin boundary condition. Furthermore, we show that the corresponding eigenvalue is of order O(1) as epsilon-->0.
Publication status:
Published

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Publisher copy:
10.1063/1.2768156

Authors

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Institution:
University of Oxford
Division:
MPLS
Department:
Mathematical Institute
Role:
Author


Journal:
Chaos (Woodbury, N.Y.) More from this journal
Volume:
17
Issue:
3
Pages:
037106
Publication date:
2007-09-01
DOI:
EISSN:
1089-7682
ISSN:
1054-1500


Language:
English
Pubs id:
pubs:12989
UUID:
uuid:124b1717-7a0f-4bce-aa67-5341b39b5efe
Local pid:
pubs:12989
Source identifiers:
12989
Deposit date:
2012-12-19
ARK identifier:

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