BMO is the intersection of two translates of dyadic BMO
classification
🧮 math.CA
keywords
denotedyadicspacecircleclassicalintersctionintersectionprove
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Let T be the unite circle on $R^2$. Denote by BMO(T) the classical BMO space and denote by BMO_D(T) the usual dyadic BMO space on T. We prove that, BMO(T) is the intersction of BMO_D(T) and a translate of BMO_D(T).
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