曲率是黎曼几何中的热门研究课题。
Positive curvature has been a frequent subject in Riemannian geometry.
结果与用黎曼几何表述的广义相对论和实际观测相符。
These results are in agreement with those obtained by general relativity expressed in Riemannian geometry and that from practical observations.
本文对牛顿万有引力定律提出了一种非黎曼几何的相对论性的可能修正公式。
In this paper, a possible Correction of non-Riemannian geometric relativity is made for Newton's Law of Gravitation.
在空间相似三角形注视点估计算法的基础上,提出一种基于黎曼几何的视线落点补偿方法 。
One novel gaze point compensation algorithm in Riemannian space was proposed in this paper based on the estimation algorithm of gaze point in space similar triangles.
黎曼流形运动群的研究是微分几何中一个重要问题。
Research of the group of motions in Riemann manifold is an important question of the differential geometry.
本文在分析黎曼的几何思想的基础上,着重论述了它对数学和物理学两个领域所产生的深远影响。
The geometric thinking in the analysis Liman , on the basis of mathematics and physics it focuses on the two areas of the far-reaching implications.
这其中,19世纪前半叶几何学对黎曼有着直接影响;
The geometry in the first half of 19th century had a direct influence on Riemann's thinking.
这其中,19世纪前半叶几何学对黎曼有着直接影响;
The geometry in the first half of 19th century had a direct influence on Riemann's thinking.
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