On the relationship between two kinds of Besov spaces with smoothness near zero and some other applications of limiting interpolation. (English) Zbl 1365.46027
Summary: Using limiting interpolation techniques we study the relationship between Besov spaces \(\mathbf B^{0,-1/q}_{p,q}\) with zero classical smoothness and logarithmic smoothness \(-1/q\) defined by means of differences with similar spaces \(B^{0,b,d}_{p,q}\) defined by means of the Fourier transform. Among other things, we prove that \(\mathbf B^{0,-1/2}_{2,2}=B^{0,0,1/2}_{2,2}\). We also derive several results on periodic spaces \(\mathbf B^{0,-1/q}_{p,q}(\mathbb {T})\), including embeddings in generalized Lorentz-Zygmund spaces and the distribution of Fourier coefficients of functions of \(\mathbf B^{0,-1/q}_{p,q}(\mathbb {T})\).
MSC:
| 46E35 | Sobolev spaces and other spaces of “smooth” functions, embedding theorems, trace theorems |
| 46M35 | Abstract interpolation of topological vector spaces |
| 46E30 | Spaces of measurable functions (\(L^p\)-spaces, Orlicz spaces, Köthe function spaces, Lorentz spaces, rearrangement invariant spaces, ideal spaces, etc.) |
| 42A16 | Fourier coefficients, Fourier series of functions with special properties, special Fourier series |
Keywords:
Besov spaces; logarithmic smoothness; limiting interpolation spaces; Fourier coefficients; Lorentz-Zygmund spacesReferences:
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