On functions of bounded β-dimensional mean oscillation

Abstract

In this paper, we define a notion of β-dimensional mean oscillation of functions u: Q0 ⊂ Rd R which are integrable on β-dimensional subsets of the cube Q0: align* \|u\|BMOβ(Q0):= Q ⊂ Q0 ∈fc ∈ R 1l(Q)β ∫Q |u-c| \;dHβ∞, align* where the supremum is taken over all finite subcubes Q parallel to Q0, l(Q) is the length of the side of the cube Q, and Hβ∞ is the Hausdorff content. In the case β=d we show this definition is equivalent to the classical notion of John and Nirenberg, while our main result is that for every β∈ (0,d] one has a dimensionally appropriate analogue of the John-Nirenberg inequality for functions with bounded β-dimensional mean oscillation: There exist constants c,C>0 such that align* Hβ∞ (\x∈ Q:|u(x)-cQ|>t\) ≤ C l(Q)β (-ct/\|u\|BMOβ(Q0)) align* for every t>0, u ∈ BMOβ(Q0), Q⊂ Q0, and suitable cQ ∈ R. Our proof relies on the establishment of capacitary analogues of standard results in integration theory that may be of independent interest.

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