Journal article
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 1
0, r>0, s>or=0, 1
or=0. We rigorously prove the following results on the stability of one-spike solutions: (i) If r=2 and 1 1 and tau sufficiently small the interior spike is stable. (ii) For N=1 if r=2 and 1
1 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
Actions
Access Document
- Publisher copy:
- 10.1063/1.2768156
Authors
- 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:
Terms of use
- Copyright date:
- 2007
If you are the owner of this record, you can report an update to it here: Report update to this record