The existence of infinitely many radially symmetric weak solutions for non-autonomous elliptic problems involving the p-Laplacian in the Euclidan space R^N is investigated. The approach is based on variational method. A main ingredient of proof is the famous symmetric critically principle of Palais. A concrete example of an application is pointed out.
Candito P., Giovanni M.B. (2013). Radially symmetric weak solutions for elliptic problems in ℝn. DIFFERENTIAL AND INTEGRAL EQUATIONS, 26(9-10), 1009-1026 [10.57262/die/1372858559].
Radially symmetric weak solutions for elliptic problems in ℝn
Candito P.
;
2013-01-01
Abstract
The existence of infi nitely many radially symmetric weak solutions for non-autonomous elliptic problems involving the p-Laplacian in the Euclidan space R^N is investigated. The approach is based on variational method. A main ingredient of proof is the famous symmetric critically principle of Palais. A concrete example of an application is pointed out.
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