容许扩张的度量李群

Pub Date : 2019-01-08 DOI:10.4310/ARKIV.2021.V59.N1.A5
E. Donne, Sebastiano Golo
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引用次数: 13

摘要

我们考虑李群$G$上的左不变距离$d$,其性质是存在李自同构$(0,\infty)\rightarrow\mathtt{Aut}(G)$,$\lambda \mapsto\delta_\lambda$的乘法单参数群,使得对于G$中的所有$x,y\和所有$\lamba>0$,$d(\delta-\lambda x,\deltaon\lambda y)=\lambda d(x,y)$。首先,我们证明了所有这些距离都是可容许的,也就是说,它们诱导了流形拓扑。其次,利用李自同构的无穷小生成元的代数性质,刻画了李自同构在某个左不变距离上的扩张的乘性单参数群。第三,我们证明了具有至少一个非平凡扩张自同构的李群上的可容许左不变距离是biLipschitz等价于允许一个扩张自同构单参数群的李群。此外无穷小生成器可以选择在$[1,\infty)$。第四,我们刻画了一个李群的自同构,它是一个在一定容许距离上扩张的自同构。最后,我们把容许扩张自同构的单参数群的度量李群刻画为唯一具有所有因子的度量扩张的局部紧等距齐次度量空间。这样的度量空间表现为加倍度量的切线具有唯一切线的空间。
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Metric Lie groups admitting dilations
We consider left-invariant distances $d$ on a Lie group $G$ with the property that there exists a multiplicative one-parameter group of Lie automorphisms $(0, \infty)\rightarrow\mathtt{Aut}(G)$, $\lambda\mapsto\delta_\lambda$, so that $ d(\delta_\lambda x,\delta_\lambda y) = \lambda d(x,y)$, for all $x,y\in G$ and all $\lambda>0$. First, we show that all such distances are admissible, that is, they induce the manifold topology. Second, we characterize multiplicative one-parameter groups of Lie automorphisms that are dilations for some left-invariant distance in terms of algebraic properties of their infinitesimal generator. Third, we show that an admissible left-invariant distance on a Lie group with at least one nontrivial dilating automorphism is biLipschitz equivalent to one that admits a one-parameter group of dilating automorphisms. Moreover, the infinitesimal generator can be chosen to have spectrum in $[1,\infty)$. Fourth, we characterize the automorphisms of a Lie group that are a dilating automorphisms for some admissible distance. Finally, we characterize metric Lie groups admitting a one-parameter group of dilating automorphisms as the only locally compact, isometrically homogeneous metric spaces with metric dilations of all factors. Such metric spaces appear as tangents of doubling metric spaces with unique tangents.
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