COMPLETE KAHLER METRICS WITH POSITIVE HOLOMORPHIC SECTIONAL CURVATURES ON CERTAIN LINE BUNDLES(RELATED TO A COHOMOGENEITY ONE POINT OF VIEW ON A YAU CONJECTURE)

In this article,we study Kahler metrics on a certain line bundle over some compact Kahler manifolds to find complete Kahler metrics with positive holomorphic sectional(or bisectional)curvatures.Thus,we apply a strategy to a famous Yau conjecture with a co-homogeneity one geometry.

THE NONLINEAR BOUNDARY VALUE PROBLEM FOR k HOLOMORPHIC FUNCTIONS IN C^(2)

k holomorphic functions are a type of generation of holomorphic functions.In this paper,a nonlinear boundary value problem for k holomorphic functions is primarily discussed on generalized polycylinders in C^(2).The existence of the solution for the problem is studied in detail with the help of the boundary properties of Cauchy type singular integral operators with a k holomorphic kernel.Furthermore,the integral representation for the solution is obtained.

基于全纯嵌入的电力系统不确定性仿射潮流方法

仿射潮流算法是求解新型电力系统状态量分布特征的重要手段。针对现有仿射潮流算法保守度较高、算法效率较低且需要选择合适的迭代初始值等不足之处,该文提出一种基于全纯嵌入的不确定性仿射潮流计算方法。首先,构建电力系统节点电压和功率仿射模型,并建立系统仿射潮流方程。在此基础上,将嵌入因子引入到仿射潮流方程中,构造具有泰勒级数形式的全纯嵌入仿射潮流模型;接着,将仿射潮流求解问题转换为泰勒幂级数系数的求解问题,获取状态量初始解及递推关系,计算不确定性潮流的仿射解。最后,算例验证所提算法具有保守性低、计算效率高和量化分析分布式电源出力对电压影响等优势。

基于全纯嵌入法的配电网光伏接纳能力评估方法

针对大规模分布式光伏接入给配电网带来的电压越限风险,提出了一种基于改进全纯嵌入法的光伏接纳能力评估方法。首先,引入离散-聚合方法对时序数据进行处理,利用所生成极端场景集代替原序列进行接纳能力评估;其次,在传统全纯嵌入模型基础上构建了自定义方向模型,进一步推导了满足电压约束的可行域范围,并将节点Sigma轨迹与可行域边界相交作为单次运算下光伏最大接纳容量的判据;然后,利用蒙特卡罗模拟生成相互独立的光伏接入方案,使用所提判据确定各方案下极端场景集对应的接纳容量;最后,统计计算结果,获取光伏接纳容量的累计分布曲线,以此确定电压越限风险下系统的光伏接纳能力。在IEEE 33节点配电网系统上验证了所提方法的有效性和可行性。

主动配电网潮流的全纯嵌入计算方法

配电网潮流计算是进行配电网规划和运行的重要基础。目前,配电网潮流求解方法主要有牛拉(Newton Raphson,NR)法和前推回代(forward backward substitution,FBS)法两大类,但NR法和FBS法在潮流收敛性和计算效率等方面均存在一定的不足。全纯嵌入法(holomorphic embedding method,HEM)是一种求解非线性潮流方程的新方法,它可以有效避免NR法和FBS法在配电网潮流求解过程中出现的上述问题,但现有HEM未充分考虑配电网中各类型分布式电源(distributed generation,DG)和智能软开关(soft open point,SOP)控制方式的多样性,且未构建计及负荷电压特性和频率特性的潮流模型,难以适用于不同运行模式下配电网潮流计算。针对上述问题,提出一种可求解含多类型DG和SOP且可运行在并网/孤岛模式的主动配电网统一全纯嵌入潮流计算方法。首先,根据负荷静态电压和频率特性,构建计及配电网频率和节点电压影响的负荷节点全纯嵌入潮流模型;其次,根据DG不同的控制方式以及配电网不同的运行模式,将DG所连节点等效为不同节点类型,构建各类DG的全纯嵌入潮流模型;再次,考虑SOP不同控制方式,构建SOP全纯嵌入潮流模型;从次,依据全纯嵌入潮流模型等式左右两侧同次幂级数系数相等原则,推导配电网各全纯函数幂级数系数的求解递推关系式,进而计算各全纯函数的各项幂级数系数,借助解析延拓理论求取电压和频率逼近值,实现配电网潮流的准确求解;最后,通过修改的IEEE-33节点测试系统和IEEE-123节点测试系统验证所提方法准确性和有效性。

电-气互联系统仿射能流交替递归计算方法

在源荷不确定性日益显著的背景下,不确定性能流计算对电-气互联系统能源优化调度具有重要意义。针对天然气网络仿射能流算法面临的仿射数矩阵求逆运算复杂、难以适用环网等问题,该文提出一种天然气网络全纯嵌入仿射能流方法。在此基础上,根据耦合设备处的能量流动对电、气子系统能流方程进行重构,构建全纯嵌入的电-气仿射多能流模型。为降低多能流计算的初值依赖性、提升多能流计算效率,提出一种仿射能流交替递归计算方法,将电网空载状态的状态量初值作为多能流计算起始点,基于各仿射型状态量的幂级数系数递推关系,以交替进行的方式逐阶递归计算电网、气网和耦合设备的仿射型状态量幂级数系数,求解电-气互联系统的能流分布区间。仿真结果验证了所提方法在算法保守性、收敛性和计算效率等方面的优势。

基于全纯嵌入潮流计算的可靠节点类型转换研究

针对潮流计算中节点类型转换可能导致的非可运行解问题,提出了一种基于全纯嵌入的可靠节点类型转换方法。首先,构建了考虑发电机节点无功功率和电压约束的潮流方程,并分析了目前常用的节点类型转换方法可能导致的非可运行解问题。然后基于复分析理论和全纯嵌入方法设计了潮流方程的全纯嵌入形式,并推导求解电压及发电机无功功率幂级数的递推方程。基于发电机无功功率幂级数判断发电机无功功率越限顺序,并设计了节点类型转换框架。最后,采取IEEE标准算例进行测试,表明了该方法能够较可靠地得到潮流方程的可运行解。

无界域上全纯Cliffordian函数的若干性质及其Cauchy型积分的边值特性

首先介绍了定义于Euclidean空间,取值于实Clifford代数的全纯Cliffordian函数.然后利用正则函数的性质讨论了全纯Cliffordian函数的若干性质和空间性质.主要借用第一类拟置换得出全纯Cliffordian函数的等价条件,研究了它与正则函数之间的关系.接下来以Cauchy积分公式和Plemelj公式为基础,得出了开拓定理.最后定义了无界域上的Cauchy型积分,并证得它在Cauchy主值意义下收敛.同时利用一些重要的积分估值得出了无界域上的Plemelj公式.

A REFINEMENT OF THE SCHWARZ-PICK ESTIMATES AND THE CARATHéODORY METRIC IN SEVERAL COMPLEX VARIABLES

In this article,we first establish an asymptotically sharp result on the higher order Fréchet derivatives for bounded holomorphic mappings f(x)=f(0)+∞∑s=1Dskf(0)(x^(sk))/(sk)!:B_(X)→B_(Y),where B_X is the unit ball of X.We next give a sharp result on the first order Fréchet derivative for bounded holomorphic mappings F(X)=F(0+)∞∑s=KD^(s)f(0)(x^(8)/s!):B_(X)→B_(Y),where B_(X)is the unit ball of X.The results that we derive include some results in several complex variables,and extend the classical result in one complex variable to several complex variables.

基于全纯嵌入线性潮流的配电网灵活性资源优化配置

针对配电网考虑电压波动的灵活性资源配置模型因非线性潮流计算而难以求解的问题,本文提出一种基于全纯嵌入线性潮流的灵活性资源优化配置方法。首先,基于快速灵活的全纯嵌入潮流法,开展电压全纯函数的幂级数系数分析,建立一个适用于优化配置研究的全纯嵌入线性化潮流模型;其次,建立统一的配电网灵活性资源模型,以最小化平均电压偏差和日运行成本为目标函数,建立多目标灵活性资源优化配置模型,利用所提线性潮流模型将混合整数非线性的优化配置模型转化为混合整数线性模型。最后,利用改进的IEEE33节点测试系统进行仿真,结果验证了所提线性化优化配置模型的有效性。

基于全纯嵌入的多时间断面潮流快速计算方法

为分析新型电力系统的长时间尺度特性,需开展多时间断面下的潮流计算。提出基于全纯嵌入的多时间断面潮流快速计算方法,在较小的误差下实现配电网多时间断面电压幅值和相角的快速计算。对全纯嵌入法中的电压幂级数系数开展数值分析,推导出电压幂级数系数的线性计算方法。在此基础上,提出2种多时间断面潮流快速计算方式。配电网测试系统的测试结果验证了所提方法的有效性。

一类Hartogs域的Bergman核函数

利用Bergman核函数定义以及双全纯等价域之间Bergman核函数的关系,计算一类以典型域直乘积为底空间的Hartogs域的Bergman核函数的显式表达式。

最大模原理在无穷域中的运用及其推广

本文运用最大模原理,研究了一类在复平面中以原点为对称中心的正n边形内连续且全纯的函数f。如果|f|在该正n边形内的上确界为M,且在该正n边形的某条边上的上确界为m,则可得出|f|在以原点为顶点和该条边为底边所形成的闭三角形内的上界。进而研究了一类在复平面中无穷条形区域以及无穷扇形区域内连续且全纯的函数f,并将它们推广到两种月牙形区域和两相切抛物线所形成的无穷区域,从而得到了一些重要的结论。

NORMAL FAMILIES AND SHARED VALUES OF HOLOMORPHIC FUNCTIONS

Let F be a family of holomorphic functions in a domain D, k be a positive integer, a, b（≠0）, c（≠0） and d be finite complex numbers. If, for each f∈F, all zeros of f-d have multiplicity at least k, f^（k） = a whenever f=0, and f=c whenever f^（k） = b, then F is normal in D. This result extends the well-known normality criterion of Miranda and improves some results due to Chen-Fang, Pang and Xu. Some examples are provided to show that our result is sharp.

NORMAL FAMILIES OF MEROMORPHIC FUNCTIONS SHARING A HOLOMORPHIC FUNCTION AND THE CONVERSE OF THE BLOCH PRINCIPLE

In this paper, we investigate normal families of meromorphic functions, prove some theorems of normal families sharing a holomorphic function, and give a counterex- ample to the converse of the Bloch principle based on the theorems.

SCHWARZ-PICK ESTIMATES FOR BOUNDED HOLOMORPHIC FUNCTIONS ON CLASSICAL DOMAINS

In this paper, Schwarz-Pick estimates for high order Fr′echet derivatives of bounded holomorphic functions on three kinds of classical domains are presented. We generalize the early work on Schwarz-Pick estimates of higher order partial derivatives for bounded holomorphic functions on the disk and unit ball.

SOME REMARKS ON HOLOMORPHIC FUNCTIONS AND TAYLOR SERIES IN C^n

Some previous results on convergence of Taylor series in C^n [3] are improved by indicating outside the domain of convergence the points where the series diverges and simplifying some proofs. These results contain the Cauchy-Hadamard theorem in C. Some Cauchy integral formulas of a holomorphic function on a closed ball in C^n are constructed and the Taylor series expansion is deduced.

ON THE HOLOMORPHIC SOLUTION OF NON-LINEAR TOTALLY CHARACTERISTIC EQUATIONS WITH SEVERAL SPACE VARIABLES

In this paper the authors study a class of non-linear singular partial differential equation in complex domain C-t x C-x(n). Under certain assumptions, they prove the existence and uniqueness of holomorphic solution near origin of C-t x C-x(n).

A NOTE ON SCHWARZ LEMMA FOR THE MODULUS OF HOLOMORPHIC MAPPINGS ON D

In this note, we consider a holomorphic mapping f from the unit disk C in C to p-ball B^p = {z∈C^n;i=1∑n｜zi｜p〈1,1〈p〈＋∞. It is proved that for such f,｜ ｜ ｜f｜｜（z）｜≤1-｜｜f（z）｜｜^2/1-｜z｜^2,z∈D. The extremal problem is also discussed when p is an even number. This result extends some related results on Schwarz lemma.

SCHWARZ-PICK ESTIMATES FOR PARTIAL DERIVATIVES OF ARBITARY ORDER OF BOUNDED HOLOMORPHIC FUNCTIONS IN THE UNIT BALL OF C^n

This paper gives a Schwarz-Pick estimate for bounded holomorphic functions in the unit ball of C n .