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Romero Ruiz del Portal, Francisco and Salazar, J. M.
(2015)
*Index 1 fixed points of orientation reversing
planar homeomorphisms.*
Topological Methods in Nonlinear Analysis, 46
(1).
pp. 223-226.
ISSN 1230-3429

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Official URL: http://apcz.pl/czasopisma/index.php/TMNA/article/view/TMNA.2015.044

## Abstract

Let U subset of R-2 be an open subset, f : U -> f (U) subset of R-2 be an orientation reversing homeomorphism and let 0 is an element of U be an isolated, as a periodic orbit, fixed point. The main theorem of this paper says that if the fixed point indices i(R2)(f, 0) = i(R2)(f(2), 0) = 1 then there exists an orientation preserving dissipative homeomorphism phi: R-2 -> R-2 such that f(2) = phi in a small neighbourhood of 0 and {0} is a global attractor for phi. As a corollary we have that for orientation reversing planar homeomorphisms a fixed point, which is an isolated fixed point for f(2), is asymptotically stable if and only if it is stable. We also present an application to periodic differential equations with symmetries where orientation reversing homeomorphisms appear naturally

Item Type: | Article |
---|---|

Uncontrolled Keywords: | Fixed point index; Conley index; Orientation reversing homeomorphisms; Attractors; Stability |

Subjects: | Sciences > Mathematics > Geometry |

ID Code: | 34835 |

Deposited On: | 18 Dec 2015 09:24 |

Last Modified: | 12 Dec 2018 15:12 |

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