1993
DOI: 10.1007/bf01053164
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Bifurcations toN-homoclinic orbits andN-periodic orbits in vector fields

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Cited by 79 publications
(70 citation statements)
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“…In order to meet the boundary conditions in item (iii), we will need to insert x ± = q(ξ) + u ± (µ)(ξ) + v ± (ξ) into the nonlinear equation (6.1). We find that v ± must solve the equations 12) in which the nonlinearities M ± are given by…”
Section: Lin's Methods For Mfdesmentioning
confidence: 99%
See 1 more Smart Citation
“…In order to meet the boundary conditions in item (iii), we will need to insert x ± = q(ξ) + u ± (µ)(ξ) + v ± (ξ) into the nonlinear equation (6.1). We find that v ± must solve the equations 12) in which the nonlinearities M ± are given by…”
Section: Lin's Methods For Mfdesmentioning
confidence: 99%
“…The former of these has been analyzed by several authors [7,12] using Lyapunov-Schmidt techniques, that unfortunately break down when studying the orbit-flip bifurcation. However, employing the adaptation of Lin's method discussed above, Sandstede obtained a general description of this bifurcation for ODEs in [16].…”
Section: Introductionmentioning
confidence: 99%
“…See [6] for homoclinic bifurcation problems in generic systems with resonant eigenvalues. Condition (H 4) excludes an orbit flip condition (see [34]), while (2.1) is a generalization of the noninclination flip condition (see [23,19]). Note that these conditions are automatically satisfied if Fix G γ is two-dimensional, independent of the dimension of the entire space.…”
Section: Setting and Main Resultsmentioning
confidence: 99%
“…homoclinic orbits have been investigated by Homburg, Kokubu and Naudot [6], Kisaka, Kokubu and Oka [10,11] and Naudot [12]. For certain configurations of eigenvalues at the saddle point these homoclinic flip bifurcations cannot only cause homoclinic-doubling, but may also generate chaos; see Section 2 for more details.…”
Section: Introductionmentioning
confidence: 99%
“…The structure of the unfolding of a bifurcation of type ✬ was found in [10,11,6] for the inclination flip, and in [9] for the orbit flip. For an overview of the fan depicted in Figure 5 and the other possibilities for type ❸ see [19] and further references therein.…”
mentioning
confidence: 99%