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Equadiff 6 pp 227-234 | Cite as

Stability and bifurcation problems for reaction-diffusion systems with unilateral conditions

  • M. Kučera
Lectures Presented In Sections Section B Partial Differential Equations
Part of the Lecture Notes in Mathematics book series (LNM, volume 1192)

Keywords

Bifurcation Point Trivial Solution Destabilize Effect Boundary Condition Closed Convex Cone 
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References

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    DRÁBEK, P. and KUČERA, M.: Eigenvalues of inequalities of reaction-diffusion type and destabilizing effect of unilateral conditions. 36(111), 1986,Czechoslovak Math. J. 36 (111), 1986, 116–130.Google Scholar
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    DRÁBEK, P. and KUČERA,M.: Reaction-diffusion systems: Destabilizing effect of unilateral conditions. To appear.Google Scholar
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    DRÁBEK, P., KUČERA, M. and MÍKOVÁ, M.: Bifurcation points of reaction-diffusion systems with unilateral conditions. Czechoslovak Math. J. 35 (110), 1985, 639–660.MathSciNetzbMATHGoogle Scholar
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    KUČERA, M.: Bifurcation points of variational inequalities. Czechoslovak Math. J. 32 (107), 1982, 208–226.MathSciNetzbMATHGoogle Scholar
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    KUČERA, M.: Bifurcation points of inequalities of reaction-diffusion type. To appear.Google Scholar
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    KUČERA, M. and NEUSTUPA, J.: Destabilizing effect of unilateral conditions in reaction-diffusion systems. To appear in Comment. Math. Univ. Carol. 27 (1986), 171–187.MathSciNetzbMATHGoogle Scholar
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    MIMURA, M. and NISHIURA, Y.: Spatial patterns for an interaction-diffusion equations in morphogenesis. J. Math. Biology 7, 243–263, (1979).MathSciNetCrossRefzbMATHGoogle Scholar

Copyright information

© Equadiff 6 and Springer-Verlag 1986

Authors and Affiliations

  • M. Kučera
    • 1
  1. 1.Mathematical InstituteCzechoslovak Academy of SciencesPrague 1Czech Republic

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