We extend a Liouville-type result of D. G. Aronson and H. F. Weinberger and E.N. Dancer and Y. Du concerning solutions to the equation Δpu = b (x) f (u) to the case of a class of singular elliptic operators on Riemannian manifolds, which include the φ-Laplacian and are the natural generalization to manifolds of the operators studied by J. Serrin and collaborators in Euclidean setting. In the process, we obtain an a priori lower bound for positive solutions of the equation in consideration, which complements an upper bound previously obtained by the authors in the same context.
Pigola, S., Rigoli, M., Setti, A. (2005). A Liouville-type result for quasi-linear elliptic equations on complete Riemannian manifolds. JOURNAL OF FUNCTIONAL ANALYSIS, 219(2), 400-432 [10.1016/j.jfa.2004.05.009].
A Liouville-type result for quasi-linear elliptic equations on complete Riemannian manifolds
PIGOLA, STEFANO;
2005
Abstract
We extend a Liouville-type result of D. G. Aronson and H. F. Weinberger and E.N. Dancer and Y. Du concerning solutions to the equation Δpu = b (x) f (u) to the case of a class of singular elliptic operators on Riemannian manifolds, which include the φ-Laplacian and are the natural generalization to manifolds of the operators studied by J. Serrin and collaborators in Euclidean setting. In the process, we obtain an a priori lower bound for positive solutions of the equation in consideration, which complements an upper bound previously obtained by the authors in the same context.
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