On compact embeddings in Lp and fractional spaces
Abstract
The study of the fractional Laplacian operator (-)s in RN with Dirichlet boundary conditions gained enormous momentum through its identification with a Neumann operator in RN× (0, ∞)=RN+1+, a method mainly introduced by Caffarelli and Silvestre. Since then, several other operators have been studied using this method. In general, a crucial question is attached to this method: the embedding (in the trace sense) on the ground space Lq(RN) is compact? This question is very important when dealing with problems of existence of solutions. This paper aims to answer this question for some operators. Passing to an abstract setting, let X,Y be Hilbert spaces and A X X' a continuous and symmetric elliptic operator. We suppose that X is dense in Y and that the embedding X⊂ Y is compact. In this paper we show some consequences of this setting for the study of the fractional operator attached to A in the extension setting ×(0,∞) or RN+1+. Being more specific, we will give some examples where the embedding of the extension domain into L2() is compact, even in the case =RN.
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