A new type of bmo space for non-doubling measures
Abstract
Let μ be a Radon measure on Rd which may be non-doubling and only satisfies μ(Q(x,l)) C0ln for all x∈ Rd, l(Q)>0, with some fixed constants C0>0 and n∈ (0,d]. We introduce a new type of bmo(μ) space which looks bigger than the rbmo(μ) space of Dachun Yang (JAMS,\,2005). And its four equivalent norms are established by constructing some special types of auxiliary doubling cubes. Then we further obtain that this new rbmo(μ) space actually coincides with the rbmo(μ) space of Dachun Yang.
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