It is concerned with the size of bounded functions in Besov spaces. It reports that every closed subspace consisted with bounded functions in Besov spaces $B_{p, p}^s ( {\mathbb{T}}^d ) $ ($s < 0$) is finite dimensional.
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다국어 초록 (Multilingual Abstract)
It is concerned with the size of bounded functions in Besov spaces. It reports that every closed subspace consisted with bounded functions in Besov spaces $B_{p, p}^s ( {\mathbb{T}}^d ) $ ($s < 0$) is finite dimensional.
It is concerned with the size of bounded functions in Besov spaces. It reports that every closed subspace consisted with bounded functions in Besov spaces $B_{p, p}^s ( {\mathbb{T}}^d ) $ ($s < 0$) is finite dimensional.
SEQUENTIAL PROPERTIES OF SUMS OVER STIRLING-PASCAL MATRIX
CONTINUUM-WISE EXPANSIVE DIFFEOMORPHISMS ON TWO DIMENSIONAL MANIFOLD
A NOTE ON CHAIN TRANSITIVITY OF LINEAR DYNAMICAL SYSTEMS
HYPERSTABILITY OF A GENERAL QUINTIC FUNCTIONAL EQUATION AND A GENERAL SEPTIC FUNCTIONAL EQUATION