Classic and exotic Besov spaces induced by good grids
Abstract
In a previous work we introduced Besov spaces Bsp,q defined on a measure spaces with a good grid, with p∈ [1,∞), q∈ [1,∞] and 0< s< 1/p. Here we show that classical Besov spaces on compact homogeneous spaces are examples of such Besov spaces. On the other hand we show that even Besov spaces defined by a good grid made of partitions by intervals may differ from a classical Besov space, giving birth to exotic Besov spaces.
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