中文

Composition Semigroups on BMOA and $H^{\infty}$

泛函分析 2026-06-26 v1 复变函数

摘要

We study [ϕt,X][\phi_t , X], the maximal space of strong continuity for a semigroup of composition operators induced by a semigroup {ϕt}t0\{\phi_t\}_{t\ge0} of analytic self-maps of the unit disk, when XX is BMOA, HH^\infty or the disk algebra. In particular, we show that [ϕt,BMOA]BMOA[\phi_t,\text{BMOA}] \neq \text{BMOA} for all nontrivial semigroups. We also prove, for every semigroup {ϕt}t0\{\phi_t\}_{t\ge0}, that limt0+ϕt(z)=z\lim_{t \to 0^+} \phi_t(z) = z not just pointwise, but in HH^{\infty} norm. This provides a unified proof of known results about [ϕt,X][\phi_t , X] when X{Hp,Ap,B0,VMOA}X \in \{H^p, A^p, \mathcal B_0, \text{VMOA}\}.

引用

@article{arxiv.2606.28647,
  title  = {Composition Semigroups on BMOA and $H^{\infty}$},
  author = {Austin Anderson and Mirjana Jovovic and Wayne Smith},
  journal= {arXiv preprint arXiv:2606.28647},
  year   = {2026}
}