Commutators for approximation spaces and Marcinkiewicz-type multipliers (Q1125461)

Taking into account that the description of approximation spaces and the calculation of almost optimal approximation elements, in combination with real interpolation, are very useful in the commutation theorems, the author shows, in this paper, under some conditions weaker than those of Marcinkievicz multiplier theorem, that the multiplier operator \(T_\mu (\sum_k c_ke^{ikt})= \sum_k \mu_kc_ke^{ikt}\) satisfies on the Besov space \(B_p^{\sigma,p}\) the commutator theorem \(\|[T,T_\mu] \|_{B_p^{\sigma,q}, B_p^{\sigma,q}}\leq c \|T\|\), where \(\|T\|=\max(\|T \|_{B_p^{\sigma,q}, B^{\sigma_0, q_0}},\|T \|_{B_p^{\sigma_1, q_1},B_p^{\sigma_1, q_1}})\) and \(\sigma_0 >\sigma> \sigma_1>0\).