Group actions on strongly monotone dynamical systems

1. Amann, H.: Fixed point equations and nonlinear eigenvalue problems in ordered Banach spaces. SIAM Rev.18, 620–709 (1976)

   Google Scholar 

2. Amann, H.: Quasilinear evolution equations and parabolic systems. Trans. Am. Math. Soc.293, 191–227 (1986)

   Google Scholar 

3. Amann, H.: Quasilinear parabolic systems under nonlinear boundary conditions. Arch. Rat. Mech. Anal.92, 153–192 (1986)

   Google Scholar 

4. Amann, H.: Parabolic evolution equations and nonlinear boundary conditions. J. Differ. Equations72, 201–269 (1988)

   Google Scholar 

5. Chernoff, P., Marsden, J.E.: On continuity and smoothness of group actions. Bull. Am. Math. Soc.76, 1044–1049 (1970)

   Google Scholar 

6. Golubitsky, M., Schaeffer, D.: Singularities and groups in bifurcation theory. Applied Mathematical Sciences 51. Berlin Heidelberg New York: Springer 1986

   Google Scholar 

7. Henry, D.: Geometric theory of semilinear parabolic equations. Lecture Notes Mathematics. Vol. 840. Berlin Heidelberg New York: Springer 1981

   Google Scholar 

8. Hirsch, M.W.: Differential equations and convergence almost everywhere in strongly monotone flows. Contemp. Math.37, 267–282 (1983)

   Google Scholar 

9. Hirsch, M.W.: The dynamical systems approach to differential equations. Bull. Am. Math. Soc., New Ser11, 1–64 (1984)

   Google Scholar 

10. Hirsch, M.W.: Stability and convergence in strongly monotone dynamical systems. J. Reine Angew. Math.383, 1–53 (1988)

    Google Scholar 

11. Lions, P.L.: Structure of the set of steady-state solutions of semilinear heat equations. J. Differ. Equations53, 362–386 (1984)

    Google Scholar 

12. Martin, Jr., R.H.: A maximum principle for semilinear parabolic systems. Proc. Am. Math. Soc.74, 66–70 (1979)

    Google Scholar 

13. Matano, H.: Existence of nontrivial unstable sets for equilibriums of strongly order-preserving systems. J. Fac. Sci., Univ. Tokyo, Sect. I A30, 645–673 (1984)

    Google Scholar 

14. Matano, H.: Strongly order-preserving local semidynamical systems — theory and applications. In: Semigroups, theory and applications. Vol. I, Trieste 1984. (Pitman Research Notes Mathematics Series 141, pp. 178–185) Harlow: Longman 1986

    Google Scholar 

15. Montgomery, D., Zippin, L.: Topological transformation groups. Interscience Tracts in Pure and Applied Mathematics. 1. New York: Interscience 1955

    Google Scholar 

16. Mora, X.: Semilinear problems define semiflows onC ^k spaces. Trans. Am. Math. Soc.278, 21–55 (1983)

    Google Scholar 

17. Poláčik, P.: Convergence in smooth strongly monotone flows defined by semilinear parabolic equations. J. Differ. Equations (to appear)

18. Sattinger, D.H.: Bifurcation and symmetry breaking in applied mathematics. Bull. Am. Math. Soc., New Ser.3, 779–819 (1980)

    Google Scholar 

19. Triebel, H.: Interpolation theory, function spaces, differential operators. Berlin: Deutscher Verlag der Wissenschaften 1978

    Google Scholar 

20. Vanderbauwhede, A.: Local bifurcation and symmetry. Research Notes Mathematics. Vol. 75. Boston: Pitman 1982

    Google Scholar 

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