In this article holomorphic curves in the complex hyperbolic space are discussed.
研究复双曲空间中的全纯曲线。
This article was to offer the method about the complex function's differentiable and holomorphic.
文章针对被积函数是连续函数、可导函数的定积分不等式提出了几种有效的证明方法。
Using the boundary-value problem of holomorphic function and method of mathematical physics, we obtained the expression of solution for above mentioned problem.
利用全纯函数的边值问题与数学物理方法,得到了此类边值问题的解的表示式。
By the second main theorem for non-constant holomorphic curves with moving targets without counting multiplicity, the uniqueness problem of holomorphic curves is discussed.
利用非常数全纯曲线涉及活动超平面的截断型第二基本定理,讨论了全纯曲线的唯一性问题。
By the second main theorem for non-constant holomorphic curves with moving targets without counting multiplicity, the uniqueness problem of holomorphic curves is discussed.
利用非常数全纯曲线涉及活动超平面的截断型第二基本定理,讨论了全纯曲线的唯一性问题。
应用推荐