Maz'ya--Shaposhnikova Representation of Quasi-Norms of Ball Quasi-Banach Function Spaces on Spaces of Homogeneous Type with Weak Reverse Doubling Property
Abstract
Let Y(X) be a ball quasi-Banach function space on the space of homogeneous type (X,,μ) satisfying some mild additional assumptions, q∈(0,∞), and Ws,qY(X) with s∈(0,1) be the homogeneous fractional Sobolev space associated with Y(X). In this article, we show that, for any f∈ Y(X)s∈(0,1) Ws,qY(X), align* \|f\|Y(X) &s 0+ s1q\| \∫X |f(·)-f(y)|qU(·,y)[(·,y)]sq \, dμ(y) \1q\|Y(X)\\ &≤ s 0+ s1q\|\∫X |f(·)-f(y)|qU(·,y)[(·,y)]sq \, dμ(y) \1q\|Y(X) \|f\|Y(X), align* where U(x,y):=\μ(B(x,(x,y))),\,μ(B(y,(x,y)))\ for any x,y∈X and the implicit positive constants are independent of f, which is applied to ten specific ball quasi-Banach function spaces and hence is of wide generality. In particular, when Y(X)=Lq(Rn) with q∈[1,∞), the above formula is closely related to the celebrated result of Maz'ya and Shaposhnikova in 2002. We also establish the above representation formula on domains of X. The main novelty lies in proposing two new concepts, namely the weak reverse doubling condition (for X) and the weak measure density condition (for domains of X), which are proved to be necessary in some sense. In addition, we find an interesting fact that, when the underlying space under consideration is bounded, the above Maz'ya--Shaposhnikova-type limit always tends to zero.
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