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Book Categories |
Preface | ||
Contents | ||
Ch. 1 | Introduction | |
Ch. 2 | Category, genus and critical point theory with symmetries | |
Ch. 3 | Category and genus of infinite-dimensional representation spheres | |
Ch. 4 | The length of G-spaces | |
Ch. 5 | The length of representation spheres | |
Ch. 6 | The length and Conley index theory | |
Ch. 7 | The exit-length | |
Ch. 8 | Bifurcation for O(3)-equivariant problems | |
Ch. 9 | Multiple periodic solutions near equilibria of symmetric Hamiltonian systems | |
References | ||
Index |
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Add Topological Methods for Variational Problems with Symmetries, Symmetry has a strong impact on the number and shape of solutions to variational problems. This has been observed, for instance, in the search for periodic solutions of Hamiltonian systems or of the nonlinear wave equation; when one is interested in e, Topological Methods for Variational Problems with Symmetries to the inventory that you are selling on WonderClubX
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Add Topological Methods for Variational Problems with Symmetries, Symmetry has a strong impact on the number and shape of solutions to variational problems. This has been observed, for instance, in the search for periodic solutions of Hamiltonian systems or of the nonlinear wave equation; when one is interested in e, Topological Methods for Variational Problems with Symmetries to your collection on WonderClub |