Sobolev spaces and hyperbolic fillings
Abstract
Let Z be an Ahlfors Q-regular compact metric measure space, where Q>0. For p>1 we introduce a new (fractional) Sobolev space Ap(Z) consisting of functions whose extensions to the hyperbolic filling of Z satisfies a weak-type gradient condition. If Z supports a Q-Poincar\'e inequality with Q>1, then AQ(Z) coincides with the familiar (homogeneous) Haj asz-Sobolev space.
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