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Rigidity of holomorphic generators and one-parameter semigroups

复变函数 2007-05-23 v1

摘要

In this paper we establish a rigidity property of holomorphic generators by using their local behavior at a boundary point τ\tau of the open unit disk Δ\Delta. Namely, if fHol(Δ,C)f\in\mathrm{Hol}(\Delta,\mathbb{C}) is the generator of a one-parameter continuous semigroup {Ft}t0\{F_{t}\}_{t\geq0}, we state that the equality f(z)=o(zτ3)f(z)=o(|z-\tau|^{3}) when zτz\to\tau in each non-tangential approach region at τ\tau implies that ff vanishes identically on Δ\Delta. Note, that if FF is a self-mapping of Δ\Delta then f=IFf=I-F is a generator, so our result extends the boundary version of the Schwarz Lemma obtained by D. Burns and S. Krantz. We also prove that two semigroups {Ft}t0\{F_{t}\}_{t\geq0} and {Gt}t0\{G_{t}\}_{t\geq0}, with generators ff and gg respectively, commute if and only if the equality f=αgf=\alpha g holds for some complex constant α\alpha. This fact gives simple conditions on the generators of two commuting semigroups at their common null point τ\tau under which the semigroups coincide identically on Δ\Delta.

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引用

@article{arxiv.math/0512482,
  title  = {Rigidity of holomorphic generators and one-parameter semigroups},
  author = {M. Elin and M. Levenshtein and D. Shoikhet and R. Tauraso},
  journal= {arXiv preprint arXiv:math/0512482},
  year   = {2007}
}

备注

20 pages