Uniform Sobolev, interpolation and geometric Calder\'on-Zygmund inequalities for graph hypersurfaces
Abstract
In this note, our aim is to show that families of smooth hypersurfaces of Rn+1 which are all C1--close enough to a fixed compact, embedded one, have uniformly bounded constants in some relevant inequalities for mathematical analysis, like Sobolev, Gagliardo-Nirenberg and ``geometric'' Calder\'on-Zygmund inequalities. This technical result is quite useful, in particular, in the study of the geometric flows of hypersurfaces.
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