对数Bloch型空间上微分复合算子乘积的本性范数

目的为刻画微分复合算子乘积C_(φ)D^(m)在对数Bloch型空间上的本性范数特征。方法利用有界序列{z^(n)}∞n=1刻画对数Bloch型空间上微分复合算子乘积C_(φ)D^(m)的有界性特征,以及泛函分析中的算子理论,例如紧算子性质和对本性范数上下界的估计。结果在C_(φ)D^(m)有界的条件下,给出了微分复合算子C_(φ)D^(m)的本性范数特征,即这里m为非负正整数,微分复合算子乘积为C_(φ)D^(m)f=f(m)°φ。结论在C_(φ)D^(m)有界的条件下,则微分复合算子C_(φ)D^(m)的本性范数可由有界序列{z^(n)}∞n=1的特征刻画。

A Note of the Interpolating Sequence in Q_(p)∩H^(∞)

In this paper,{z_(n)}_(n=1)^(∞)acts as an interpolating sequence for Q_(p)∩H^(∞).An analytic function f is constructed,and f(z_(n))=∑_(j)λ_(j)f_(z_(j))(z_(n))=λ_(n),n=1,2,…for any{λ_(n)}∈l~∞,wheref and{λn}∈l^(∞),where f and f_(zj)belong to Q_(p)∩H^(∞).As a result,the study achieves a comparable outcome for F(p,p-2,s)∩H^(∞).