All Stories

  1. Equivariant bifurcations in four-dimensional fixed point spaces
  2. Wie das Chaos in die Welt kam
  3. Molien series and low-degree invariants for a natural action of ${\rm SO}(3)\;\wr \;{{{\rm Z}}_{2}}$
  4. Erratum to: The Jacobi Matrix for Functions in Noncommutative Algebras
  5. Equivariant Bifurcation and Absolute Irreducibility in $$\mathbb {R}^8$$ R 8 : A Contribution to Ize Conjecture and Related Bifurcations
  6. The Jacobi Matrix for Functions in Noncommutative Algebras
  7. Preface
  8. Bifurcations from Synchrony in Homogeneous Networks: Linear Theory
  9. Dynamics and geometry in forced symmetry breaking: a tetrahedral example
  10. Forced Symmetry Breaking and Relative Periodic Orbits
  11. Heteroclinic Cycles and Fluid Motions in Rotating Spheres
  12. Methods in Equivariant Bifurcations and Dynamical Systems
  13. Forced Symmetry Breaking: Theory and Applications
  14. Automatic classification of normal forms
  15. Bifurcation analysis for spherically symmetric systems using invariant theory
  16. Le théorème de Hartman-Grobman et la réduction à l'espace des orbites
  17. Symmetry Breaking in Dynamical Systems
  18. A systematic study of heteroclinic cycles in dynamical systems with broken symmetries
  19. Exclusion of Relative Equilibria
  20. Symmetry-breaking at non-positive solutions of semilinear elliptic equations
  21. Heteroclinic cycles in dynamical systems with broken spherical symmetry
  22. Spontaneous symmetry breaking in higher dimensional fixed point spaces
  23. Forced Symmetry Breaking from O(3)
  24. Dynamics near steady state bifurcations in problems with spherical symmetry
  25. Steady-State bifurcation with 0(3)-Symmetry
  26. The Instability of Axisymmetric Solutions in Problems with Spherical Symmetry
  27. A bifurcation theorem for critical points of variational problems
  28. On Bifurcation for Variational Problems
  29. Hopf bifurcation at a degenerate stationary pitchfork
  30. An example of symmetry breaking with submaximal isotropy subgroup
  31. On the principle of reduced stability