Please use this identifier to cite or link to this item: http://buratest.brunel.ac.uk/handle/2438/1517
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dc.contributor.authorWinter, M-
dc.contributor.authorWei, J-
dc.coverage.spatial37en
dc.date.accessioned2008-01-07T12:02:24Z-
dc.date.available2008-01-07T12:02:24Z-
dc.date.issued2007-
dc.identifier.citationNoDEA Nonlinear differ. equ. appl. 14 (2007), 787-823en
dc.identifier.urihttp://bura.brunel.ac.uk/handle/2438/1517-
dc.description.abstractWe consider the Gierer-Meinhardt system in the interval (-1,1) with Neumann boundary conditions for small diffusion constant of the activator and finite diffusion constant of the inhibitor. A cluster is a combination of several spikes concentrating at the same point. In this paper, we rigorously show the existence of symmetric and asymmetric multiple clusters. This result is new for systems and seems not to occur for single equations. We reduce the problem to the computation of two matrices which depend on the coefficient of the inhibitor as well as the number of different clusters and the number of spikes within each cluster.en
dc.format.extent279639 bytes-
dc.format.mimetypeapplication/pdf-
dc.language.isoen-
dc.publisherBirkhaeuser, Baselen
dc.subjectMultiple clustersen
dc.subjectsingular perturbationen
dc.subjectTuring instabilityen
dc.titleSymmetric and Asymmetric Multiple Clusters In a Reaction-Diffusion Systemen
dc.typeResearch Paperen
Appears in Collections:Dept of Mathematics Research Papers
Mathematical Sciences

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