期刊论文详细信息
Kodai Mathematical Journal
Jacobi fields of the Tanaka-Webster connection on Sasakian manifolds
Sorin Dragomir2  Elisabetta Barletta1 
[1] Università degli Studi della Basilicata Dipartimento di Matematica Campus Macchia Romana;Università degri Studi della Basilicata Dipartimento di Matematica Campus Macchia Romana
关键词: Coefficient inequality;    analytic;    univalent and starlike functions;   
DOI  :  10.2996/kmj/1162478771
学科分类:数学(综合)
来源: Tokyo Institute of Technology, Department of Mathematics
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【 摘 要 】

References(28)We build a variational theory of geodesics of the Tanaka-Webster connection ∇ on a strictly pseudoconvex CR manifold M. Given a contact form θ on M such that (M, θ ) has nonpositive pseudohermitian sectional curvature (kθ (σ) ≤ 0) we show that (M, θ) has no horizontally conjugate points. Moreover, if (M, θ) is a Sasakian manifold such that kθ (σ) ≥ k0 > 0 then we show that the distance between any two consecutive conjugate points on a lengthy geodesic of ∇ is at most π/(2 $¥sqrt{k_0}$). We obtain the first and second variation formulae for the Riemannian length of a curve in M and show that in general geodesics of ∇ admitting horizontally conjugate points do not realize the Riemannian distance.

【 授权许可】

Unknown   

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