Grace定理的推广

Grace 定理的内容如下[1,P.164.例12].定理1 设 f(z)至多是 n+1(n>0)次多项式。若存在 a,b 两点,使得 f(a)=f(b),连接 a,b 得到一直线,以这直线的中点为园心,以仅与 a,b 和 n 有关的 R(n,a,b)为半径作一园,则在这个园内或其境界上至少有一点 z,使得 f′(z)=0.本文证明,多项式的限制条件可以去掉,而代之以正则函数即可.我们有下面的定理.定理2 设函数 f(z)在区域 E 内正则,a 为 E 内任意一点,则在点 a 的某个邻域 G(?)E 内,对于任意点 b∈G/{a},必存在点 z∈G,使得     

高维电报方程的对称周期解

讨论n维电报方程的对称周期解．利用Schauder不动点定理，在非共振条件下给出了一个存在性定理．     

REGULAR RELATIONS AND MONOTONE NORMAL ORDERED SPACES

In this paper the classical theorem of Zareckii about regular relations is generalized and an intrinsic characterization of regularity is obtained. Based on the generalized Zareckii theorem and the intrinsic characterization of regularity, the authors give a characterization of monotone normality of ordered spaces. A new proof of the Urysohn-Nachbin lemma is presented which is quite different from the classical one.     

A UNICITY THEOREM FOR ENTIRE FUNCTIONS OF SEVERAL COMPLEX VARIABLES

A unicity theorem concerning the total derivative for entire functions of several complex variables is proved.     

“容球旋转体的共性”再探

文[1]、文[2]、文[3]分别给出以下3个定理： 定理1 在存在内切球的前提下，多面体的体积均等于其表面积与相应内切球半径乘积的三分之一．     

四维Minkowski空间中类时超曲面的de Sitter Gauss映射的奇点分类

本文通过类时超曲面与超平面的切触关系, 对类时超曲面的de Sitter Gauss映射的奇点进行了分类.     

应用参数假设检验分析特异功能是否存在

本文应用参数假设检验知识分析“特异功能”者是否有特异功能。     

微分中值定理ξ的变化趋势

本文采用文献［１］的方法得到了当区间的两个端点都趋向于其内一定点时，微分中值定理中ξ的变化趋势。     

SOLUTIONS OF THE EQUATION x^m＋y^m=z^m IN SL2z

This paper solves an open problem of Vaserstein. The main result is: the equation x^m y^m=z^m has a solution in SL2z if and only if m is not divisible by 4 or 6 and m is not congruent to 3 modulo 6.