Publication:
Generalized complementing maps

Thumbnail Image
Files
RomeroRuiz18.pdf (204.89 KB)
Official URL
http://www.mat.ucm.es/~jesusr/Enrique/pdfs/promero.pdf
Full text at PDC
Publication Date
2004
Authors
Advisors (or tutors)
Editors
Journal Title
Journal ISSN
Volume Title
Publisher
Complutense
Citations
Google Scholar
Exportar
DC QDC MarcXML RDF MODS METS ORE-ATOM
Research Projects
Organizational Units
Journal Issue
Abstract
In this paper we apply the generalized degree introduced by Geba, Massabo and Vignoli, in [3], to extend the notion of complementing maps defined by Fitzpatrick, Massabo and Pejsachowicz, in [1] and [2]. On the other hand, we obtain, in low dimension, a bifurcation result in terms of the linking number of some 1-dimensional manifolds. We also present a global theorem that improves a Rabinowitz’s type result contained in [3] concerning the generalized degree.
Description
UCM subjects
Ecuaciones diferenciales , Matemáticas (Matemáticas)
Unesco subjects
1202.07 Ecuaciones en Diferencias , 12 Matemáticas
Keywords
Citation
P.M. Fitzpatrick, I. Massabo, J. Pejsachowicz: On the overing dimension of the set of solutions of some nonlinear equations. Transactions AMS 296 (1986), no.2, 777–798. P.M. Fitzpatrick, I. Massabo, J. Pejsachowicz: Global several-parameter bifurcation and continuation theorems: a unified approach via complementing maps. Math. Ann. 263 (1983), 61–73. K. Geba, I. Massabo, A. Vignoli: Generalized degree and bifurcation. Nonlinear Funct.Analysis and Appl. (1986), 55–73. K. Geba: Cohomotopy groups and bifurcation. Topological methods in bifurcation theory.Les Presses de l’Universit´e de Montreal, 1985. M.W. Hirsch: Differential topology. Springer-Verlag, Berlin 1976. S.T. Hu: Homotopy theory. Academic Press, 1959. J. Ize, I. Massabo, A. Vignoli: Degree theory for equivariant maps. Transactions AMS 315 (1989),433–510. J. Ize, I. Massabo, J. Pejsachowicz, A.Vignoli: Structure and dimension of global branches of solutions of multiparameter nonlinear equations.Transactions AMS 291(1985), no.2,383–435. M.A. Kervaire: An interpretation of G. Whitehead’s generalization of Hopf’s invariant.Annals of Math. 69 (1959), no.2, 345–365. L.S. Pontryagin: Smooth manifolds and their applications in homotopy theory. Amer.Math. Soc. Translations. 11 (1959), 1–114. F.R. Ruiz del Portal: On the additivity property of the generalized degree. Math. Japonica 37 (1992), 657–664. F.R. Ruiz del Portal: On a generalized degree theory for continuous maps between manifolds.Tsukuba J. Math., 17 (1993), no. 2, 323–338. F.R. Ruiz del Portal: Generalized degree in normed spaces. Publi.Matematiques, Univ. Aut. de Barcelona 36 (1992), 157–166. F.R. Ruiz del Portal: Teorıa del grado topologico generalizado y aplicaciones. Tesis Doctoral, Univ.Complutense de Madrid, 1990.
URI
https://hdl.handle.net/20.500.14352/53199
Collections
Secciones de libros