Extremal functions for the second-order Sobolev inequality on groups of polynomial growth
Abstract
In this paper, we prove the second-order Sobolev inequalities on Cayley graphs of groups of polynomial growth. We use the discrete Concentration-Compactness principle to prove the existence of extremal functions for best constants in supercritical cases. As applications, we get the existence of positive ground state solutions to the p-biharmonic equations and the Lane-Emden systems.
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