Vector p-Laplacian like operators, pseudo-eigenvalues, and bifurcation

descriptionPublicationkeyboard_double_arrow_right Article 01 Jan 2007 Chile Publisher:American Institute of Mathematical Sciences (AIMS)Journal:Discrete and Continuous Dynamical Systems, volume 17, pages 299-321 (issn: 1078-0947, eissn: 1553-5231,

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Authors: García-Huidobro, Marta; Manásevich Tolosa, Raúl; Ward, James R.;

doi: 10.3934/dcds.2007.19.299

handle: 10533/178702

Vector p-Laplacian like operators, pseudo-eigenvalues, and bifurcation

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Abstract

Boundary value problems for systems of ordinary differential equations are studied. These systems involve asymptotically homogeneous operators. Leray-Schauder indices are calculated for these operators and the concept of pseudo-eigenvalue is defined. The existence of nontrivial solutions is studied. Conditions for bifurcation, from either zero or infinity, at the pseudo-eigenvalues are given.

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Chile

Related Organizations

University of Chile
Chile

Keywords

Applied, asymptotically homogeneous operators, Mathematics

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