Left invariant complex Finsler metrics on a complex Lie group
Abstract
In this paper, we consider a left invariant complex Finsler metric F on a complex Lie group. Using the technique of invariant frames, we prove the following properties for (G,F). First, the metric F must be a complex Berwald metric. Second, its complex spray =wiδzi on T1,0G0 can be extended to a holomorphic tangent field on T1,0G. If we view as a real tangent field on TG, it coincides with the canonical bi-invariant spray structure on G. Third, we prove that the strongly K\"ahler, K\"ahler, and weakly K\"ahler properties for F are equivalent. More over, F is K\"ahler if and only if G has an Abelian Lie algebra. Finally, we prove that the holomorphic sectional curvature vanishes.
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