Modeling and analysis of the forced Fisher equation

Modeling and analysis of the forced Fisher equation

The Fisher equation with inhomogeneous forcing is considered in this paper. First, a forced Fisher equation and boundary conditions are derived. Then, the existence of a local solution for the forced equation with a homegeneous Dirichlet condition is proved by Galerkin's method. Next, a maximum...

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Veröffentlicht in:Nonlinear analysis 2005-07, Vol.62 (1), p.19-40
Hauptverfasser: Gunzburger, M.D., Hou, L.S., Zhu, W.
Format: Artikel
Sprache:eng
Schlagworte:
Exact sciences and technology
Mathematical analysis
Mathematics
Partial differential equations
Sciences and techniques of general use
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Zusammenfassung:The Fisher equation with inhomogeneous forcing is considered in this paper. First, a forced Fisher equation and boundary conditions are derived. Then, the existence of a local solution for the forced equation with a homegeneous Dirichlet condition is proved by Galerkin's method. Next, a maximum principle is established and the existence of a global solution is obtained as a consequence of the maximum principle. Finally, generalizations of the results to cases of less regular forces are discussed.
ISSN:0362-546X
1873-5215
DOI:10.1016/j.na.2005.01.094