Homogeneous Besov spaces
Abstract
This note is based on a series of lectures delivered in Kyoto University. This note surveys the homogeneous Besov space Bspq on Rn with 1 p,q ∞ and s ∈ R in a rather self-contained manner. Possible extensions of this type of function spaces are breifly discussed in the end of this article. In particular, the fundamental properties are stated for the spaces Bspq with 0<p,q ∞ and s ∈ R and Fspq with 0<p<∞, 0<q ∞ and s ∈ R as well as nonhomogeneous coupterparts Bspq with 0<p,q ∞ and s ∈ R and Fspq with 0<p<∞, 0<q ∞ and s ∈ R.
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