BMO with respect to Banach function spaces
Abstract
For every cube Q ⊂ Rn we let XQ be a quasi-Banach function space over Q such that \|Q\|XQ 1, and for X= \XQ\ define align* \|f\|BMOX &:=Q \,\|f-1|Q|∫Qf \|XQ,\\ \|f\|BMOX* &:=Q \,∈fc\, \|f-c\|XQ. align* We study necessary and sufficient conditions on X such that BMO = BMOX = BMOX*. In particular, we give a full characterization of the embedding BMO BMOX in terms of so-called sparse collections of cubes and we give easily checkable and rather weak sufficient conditions for the embedding BMOX* BMO. Our main theorems recover and improve all previously known results in this area.
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