Partial symmetry and existence of least energy solutions to some nonlinear elliptic equations on Riemannian models
Abstract
We consider least energy solutions to the nonlinear equation -g u=f(r,u) posed on a class of Riemannian models (M,g) of dimension n 2 which include the classical hyperbolic space Hn as well as manifolds with unbounded sectional geometry. Partial symmetry and existence of least energy solutions is proved for quite general nonlinearities f(r,u), where r denotes the geodesic distance from the pole of M.
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