Pointwise Multipliers for Besov Spaces B0,bp,∞(Rn) with Only Logarithmic Smoothness

Abstract

In this article, we establish a characterization of the set M(B0,bp,∞(Rn)) of all pointwise multipliers of Besov spaces B0,bp,∞(Rn) with only logarithmic smoothness b∈R in the special cases p=1 and p=∞. As applications of these two characterizations, we clarify whether or not the three concrete examples, namely characteristic functions of open sets, continuous functions defined by differences, and the functions eik· x with k∈Zn and x∈Rn, are pointwise multipliers of B0,b1,∞(Rn) and B0,b∞,∞(Rn), respectively; furthermore, we obtain the explicit estimates of \|eik · x\|M(B0,b1,∞(Rn)) and \|eik · x\|M(B0,b∞,∞(Rn)). In the case that p∈(1,∞), we give some sufficient conditions and some necessary conditions of the pointwise multipliers of B0,bp,∞(Rn) and a complete characterization of M(B0,bp,∞(Rn)) is still open. However, via a different method, we are still able to accurately calculate \|eik · x\|M(B0,bp,∞(Rn)), k∈Zn, in this situation. The novelty of this article is that most of the proofs are constructive and these constructions strongly depend on the logarithmic structure of Besov spaces under consideration.