finite order meaning in Chinese
有限价
Examples
- B - valued dirichlet series of finite order in the plane
级数表示的整函数的增长性 - The regular growth of dirichlet series of finite order in the half plane
级数在水平直线上的增长性 - Abstract : the paper studies the random power series of general enough , and proves that the random power series of finite order do not have almost surely deficient function
文摘:研究了十分一般的随机幂级数,并证明了有限级的随机幂级数几乎必然没有亏函数 - The most important idea is that over the complex numbers , an elliptic curve looks like a torus , and the points of finite order in the group of the curve have a very simple geometric description
最重要的思想是复数域上的椭圆曲线是一个环面,曲线簇中的有限阶点有简单的几何描述。 - In this paper , we first study the growth and regular growth of dirichlet series of finite order by type function in the plane and obtain two necessary and sufficient conditions ; and prove that the growth of random entire functions defined by random dirichlet series of finite order in every horizontal straight line is almost surely equal to the growth of entire functions defined by their corresponding dirichlet series . then we define the hyper - order of dirichlet series of infinite order respectively in the plane or in the right - half plane , study the relations between the hyper - order and regular hyper - order of dirichlet series of infinite order and the cofficients ; obtain the hyper - order of random entire functions defined by random dirichlet series of infinite order in every horizontal straight line is almost surely equal to the hyper - order of entire functions defined by their corresponding dirichlet series
本文首先利用型函数研究了全平面上有限级dirichlet级数的增长性和正规增长性,得到了两个充要条件;证明了有限级随机dirichlet级数的增长性几乎必然与其在每条水平直线上的增长性相同。对于无限级dirichlet级数,分别在右半平面及全平面上定义了其超级的概念,研究了它们的超级和正规超级与其系数间的关系;得到了平面上无限级随机dirichlet级数的超级几乎必然与其在每条水平直线上的超级相同。