Sharp Adams type inequalities in Sobolev spaces Wm,nm(Rn) for arbitrary integer m
Abstract
The main purpose of our paper is to prove sharp Adams-type inequalities in unbounded domains of Rn for the Sobolev space Wm,nm(R n) for any positive integer m less than n. Our results complement those of Ruf and Sani RS where such inequalities are only established for even integer m. Our inequalities are also a generalization of the Adams-type inequalities in the special case n=2m=4 proved in Y and stronger than those in RS when n=2m for all positive integer m by using different Sobolev norms.
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