Alternative Title測地的に凸なフィンスラー曲面上で広がる測地円の伝搬挙動
Note (General)The geodesics are widely applied to studies of the geometrical structure and topological structure of manifolds. There exists a close link between the behavior of geodesics and curvature of manifolds. In general, a universal covering space has been used to study the behavior of geodesics in manifolds. In this way, the geodesic flows of compact Riemannian manifolds with negative curvature have been studied and contributed to the development of the dynamical systems. Moreover, H. Busemann and F. P. Pedersen have studied geodesics in a G-space whose universal covering spaces is straight, i.e., all geodesics are minimal. Their studies are applied to studies of geodesics in a 2-torus. N. Innami has studied the asymptotic behavior of geodesic circles in a 2-torus of revolution. N. Innami and T. Okura have proved for a Riemannian 2-torus T^2: ε-density of geodesic circles with sufficiently large radii. In this paper, we study the asymptotic behavior of geodesic circles in an orientable finitely connected and geodesically convex Finsler surface M with genus g ≥ 1. We have a generalization of their study if all geodesics in M are reversible, by using an intrinsic distance function and the Busemann function on its special covering space. In particular, this paper shows the global behavior of geodesics without assumptions on curvature and geodesically completeness of the surface. Furthermore, the absence of those assumptions is different from other previously studies of geodesics. Additionally, most of the proofs do not need the reversibility assumption on geodesics.
新大院博(理)甲第449号
開始ページ : 1
終了ページ : 42
Collection (particular)国立国会図書館デジタルコレクション > デジタル化資料 > 博士論文
Date Accepted (W3CDTF)2020-09-07T06:04:08+09:00
Data Provider (Database)国立国会図書館 : 国立国会図書館デジタルコレクション