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On topologically distinct solutions of the Dirichlet problem for Yang-Mills connections
Authors:Takeshi Isobe  Antonella Marini
Affiliation:(1) Department of Mathematics, Faculty of Science, Tokyo Institute of Technology, Oh-okayama, Meguro-ku, Tokyo 152, Japan; e-mail: isobe@math.titech.ac.jp, JP;(2) Department of Mathematics, University of Utah, Salt Lake City, Utah, USA; e-mail: marini@math.utah.edu, US;(3) Dipartimento di Matematica, Universita' di L'Aquila, 67100 L'Aquila, Italy; e-mail: marini@smaq20.univaq.it, IT
Abstract:We prove that for generic Dirichlet boundary data there exist infinitely many topologically distinct solutions to the Dirichlet problem for -Yang-Mills equations over . These are absolute Yang-Mills minimizers in topologically distinct connected components of the space of connections considered. There is a special case for which only finitely many topologically distinct solutions can be found by our method. This corresponds to the simultaneous existence of self dual and anti-self dual solutions, for the given boundary data. If the boundary data is non-flat there exists always more than one solution. This paper generalizes to Yang-Mills fields an important result by Brezis and Coron, who show existence of more than one minimizing harmonic map for non-constant Dirichlet data in two dimensions. Received February 1, 1996 / Accepted March 15, 1996
Keywords:Mathematics Subject Classification:35J50   58E15
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