Optimal Sobolev inequalities of high order with L2-remainder
Abstract
We investigate the validity of the optimal higher-order Sobolev inequality Hk2(Mn) L2nn-2k(Mn) on a closed Riemannian manifold when the remainder term is the L2-norm. Unlike the case k=1, the optimal inequality does not hold in general for k>1. We prove conditions for the validity and non-validity that depend on the geometry of the manifold. Our conditions are sharp when k=2 and in small dimensions.
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