This paper investigates the problem of convergence in the quasi-metric space.
研究非对称度量空间的收敛性。
We introduce concepts of diagonal quasi-convexity and quasi-concavity in hyperconvex metric spaces.
我们介绍了超凸度量空间中对角拟凸和拟凹的概念。
Some estimates of Gaussian curvature of conformal metric of mini mal surfaces immerse in the manifold of quasi-constant curvature were obtained.
给出了拟常曲率流形中极小曲面的共形度量的高斯曲率之上界估计。
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