Cauchy和严格微积分的起源

考察十七、十八世纪的数学状况,叙述早期微积分的技巧,讨论十八世纪微积分严格化的紧迫性,解释Euler、d’Alembert、Poisson和Lagrange所开创的数学技巧的发展过程,最后指出这些数学成果是如何被Cauchy用来建立新的严格微积分基础的.

指数有界双连续n阶α次积分C半群与高阶抽象Cauchy问题研究

算子半群理论在求解Cauchy问题等领域具有很大的应用价值,并且其在泛函分析理论等各方面的研究中同样有着重要意义。此次研究在Banach空间上,基于泛函分析、算子半群理论对柯西问题进行探讨。并基于n阶α次积分C半群的生成定理,对指数有界双连续n阶α次积分C半群的生成定理与其Laplace逆变换表达式进行推算。由结果可知,L∞范数误差在分数阶n为1.47时达到最低值,为0.04,这表明其与实际值极为接近。在T=0.2,0.5两种时刻下,中精确解和正则解的变化趋势基本一致,并且二者的误差在x∈0.1,0.9区间内接近于0。研究有效验证了指数有界双连续n阶α次积分C半群解决高阶抽象Cauchy问题具有适用性与可靠性。

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.

CAUCHY TYPE INTEGRALS AND A BOUNDARY VALUE PROBLEM IN A COMPLEX CLIFFORD ANALYSIS

Clifford analysis is an important branch of modern analysis;it has a very important theoretical significance and application value,and its conclusions can be applied to the Maxwell equation,Yang-Mill field theory,quantum mechanics and value problems.In this paper,we first give the definition of a quasi-Cauchy type integral in complex Clifford analysis,and get the Plemelj formula for it.Second,we discuss the H?lder continuity for the Cauchy-type integral operators with values in a complex Clifford algebra.Finally,we prove the existence of solutions for a class of linear boundary value problems and give the integral representation for the solution.

Multi-Level Image Segmentation Combining Chaotic Initialized Chimp Optimization Algorithm and Cauchy Mutation

To enhance the diversity and distribution uniformity of initial population,as well as to avoid local extrema in the Chimp Optimization Algorithm(CHOA),this paper improves the CHOA based on chaos initialization and Cauchy mutation.First,Sin chaos is introduced to improve the random population initialization scheme of the CHOA,which not only guarantees the diversity of the population,but also enhances the distribution uniformity of the initial population.Next,Cauchy mutation is added to optimize the global search ability of the CHOA in the process of position(threshold)updating to avoid the CHOA falling into local optima.Finally,an improved CHOA was formed through the combination of chaos initialization and Cauchy mutation(CICMCHOA),then taking fuzzy Kapur as the objective function,this paper applied CICMCHOA to natural and medical image segmentation,and compared it with four algorithms,including the improved Satin Bowerbird optimizer(ISBO),Cuckoo Search(ICS),etc.The experimental results deriving from visual and specific indicators demonstrate that CICMCHOA delivers superior segmentation effects in image segmentation.

An Effective Meshless Approach for Inverse Cauchy Problems in 2D and 3D Electroelastic Piezoelectric Structures

In the past decade,notable progress has been achieved in the development of the generalized finite difference method(GFDM).The underlying principle of GFDM involves dividing the domain into multiple sub-domains.Within each sub-domain,explicit formulas for the necessary partial derivatives of the partial differential equations(PDEs)can be obtained through the application of Taylor series expansion and moving-least square approximation methods.Consequently,the method generates a sparse coefficient matrix,exhibiting a banded structure,making it highly advantageous for large-scale engineering computations.In this study,we present the application of the GFDM to numerically solve inverse Cauchy problems in two-and three-dimensional piezoelectric structures.Through our preliminary numerical experiments,we demonstrate that the proposed GFDMapproach shows great promise for accurately simulating coupled electroelastic equations in inverse problems,even with 3%errors added to the input data.

Solving Invariant Problem of Cauchy Means Based on Wronskian Determinant

This paper studied the invariance of the Cauchy mean with respect to the arithmetic mean when the denominator functions satisfy certain conditions. The partial derivatives of Cauchy’s mean on the diagonal are obtained by using the method of Wronskian determinant in the process of solving. Then the invariant equation is solved by using the obtained partial derivatives. Finally, the solutions of invariant equations when the denominator functions satisfy the same simple harmonic oscillator equation or the denominator functions are power functions that have been obtained.

一类拟线性方程Cauchy问题的可解性

根据一类拟线性方程的积分曲面和特征曲线之间的关系,研究了一类拟线性方程Cauchy问题的可解性。给出了特征曲线的求法,并将积分曲面推广到n元函数形式。

超空间中次正则函数的Cauchy积分公式

在本文中,首先给出了超空间中次正则函数(sandwich方程D_(x)fD_(x)=0的解)的一些性质,然后证明了超空间中的Cauchy-Pompeiu公式,最后得到了超空间中的Cauchy积分公式和Cauchy积分定理.

渐近周期函数的Tauberian定理及其在抽象Cauchy问题中的应用

周期函数的有界原函数是周期函数,而渐近周期函数的有界原函数未必是渐近周期函数.该文引入了缓慢周期函数的概念,并证明了渐近周期函数的有界原函数是缓慢周期函数.有趣的是,缓慢周期函数恰好是一类特殊的S-渐近周期函数,而S-渐近周期函数早在15年前就被引入且近年来被广泛研究.在此基础上,建立了渐近周期函数的Tauberian定理及两个相关Tauberian定理.此外,将所得Tauberian定理应用到非齐次抽象Cauchy问题,得到了Cauchy问题的解具有S-渐近周期性的谱集判定定理.该文建立的渐近周期函数的Tauberian定理和抽象Cauchy问题的谱集判定定理的结论虽然比渐近周期性略弱,但彻底去掉了文献[23]中的遍历性假设.最后,构造了一个具体的Cauchy问题作为例子.值得一提地是,该Cauchy问题的非齐次项是渐近周期函数,但它的解却不是渐近周期的而是S-渐近周期的.这说明了S-渐近周期函数是一些微分方程解的“自然”函数类.

三维可压缩Navier-Stokes-Cahn-Hilliard方程组Cauchy问题解的适定性

研究了三维可压缩Navier-Stokes-Cahn-Hilliard方程组Cauchy问题解的适定性,该方程组描述了具有扩散界面的非混相两相流的流动。对于初始值在相分离附近的小扰动,运用能量方法结合Schauder不动点定理,证明了该问题全局强解的存在唯一性。

非对称Cauchy分布最大次序统计量的大数定律研究

基于非对称Cauchy分布随机阵列构造最大次序统计量,研究其大数定律问题,其中非对称Cauchy分布期望不存在。利用随机变量截尾技术和控制收敛定理,获得最大次序统计量的弱大数律和强大数律,并指出所获弱大数律不能推广到强大数律。另外,给出产生非对称Cauchy分布算法,并开展最大次序统计量的弱大数律和强大数律数据模拟工作。

An Improved Reptile Search Algorithm Based on Cauchy Mutation for Intrusion Detection

With the growth of the discipline of digital communication,the topic has acquiredmore attention in the cybersecuritymedium.The Intrusion Detection(ID)system monitors network traffic to detect malicious activities.The paper introduces a novel Feature Selection(FS)approach for ID.Reptile Search Algorithm(RSA)—is a new optimization algorithm;in this method,each agent searches a new region according to the position of the host,which makes the algorithm suffers from getting stuck in local optima and a slow convergence rate.To overcome these problems,this study introduces an improved RSA approach by integrating Cauchy Mutation(CM)into the RSA’s structure.Thus,the CM can effectively expand search space and enhance the performance of the RSA.The developed RSA-CM is assessed on five publicly available ID datasets:KDD-CUP99,NSL-KDD,UNSW-NB15,CIC-IDS2017,and CIC-IDS2018 and two engineering problems.The RSA-CM is compared with the original RSA,and three other state-of-the-art FS methods,namely particle swarm optimization,grey wolf optimization,and multi-verse optimizer,and quantitatively is evaluated using fitness value,the number of selected optimum features,accuracy,precision,recall,and F1-score evaluationmeasures.The results reveal that the developed RSA-CMgot better results than the other competitive methods applied for FS on the ID datasets and the examined engineering problems.Moreover,the Friedman test results confirm that RSA-CMhas a significant superiority compared to other methods as an FS method for ID.

分形Cauchy空间到Bloch型空间的复合算子与微分算子乘积的范数估计

对分形Cauchy空间到Bloch型空间的复合算子C_(φ)与微分算子乘积D C_(φ)、C_(φ)D进行研究,对算子D C_(φ):F_(α)→B^(β)、C_(φ)D:F_(α)→B^(β)的本性范数给出了新的估计,并对算子D C_(φ):F_(α)→B^(β)、C_(φ)D:F_(α)→B^(β)的有界性、紧性以及本性范数给出新的刻画.

分形Cauchy空间到Zygmund型空间的积分型复合算子

研究分形Cauchy空间到Zygmund型空间复合算子C_(φ)与积分算子J_(g)、I_(g)乘积的四类积分型复合算子J_(g)C_(φ)、C_(φ)J_(g)、I_(g)C_(φ)和C_(φ)I_(g),刻画了算子J_(g)C_(φ)(C_(φ)J_(g),I_(g)C_(φ),C_(φ)I_(g)):F_(α)→Z^(β)成为有界或紧的充要条件.

The Stability of the Gauss-Laguerre Rule for Cauchy P.V. Integrals on the Half Line

In this paper, the authors give a different and more precise analysis of the stability of the classical Gauss-Laguerre quadrature rule for the Cauchy P.V. integrals on the half line. Moreover, in order to obtain this result they give some new estimates for the distance of the zeros of the Laguerre polynomials that can be useful also in other contests.

基于Cauchy分布的非下采样Shearlet HMT模型及其图像去噪应用

Shearlet变换作为后小波时代的一个重要的多尺度几何分析工具具有良好的各向异性和方向捕捉性,同时它也可以对诸如图像等多维信号进行一种近最优的稀疏表示.非下采样Shearlet变换(NSST)在保持Shearlet变换特性的同时还具有平移不变特性,这在具有丰富纹理和细节信息的图像处理中发挥着重要作用.该文首先对图像NSST方向子带内系数的概率密度分布进行分析,获得系数的稀疏统计特性和Cauchy分布拟合子带内系数的有效性;其次对NSST方向子带间系数的联合概率分布进行分析,获得方向子带系数间所具有的持续和传递特性,确定了一种NSST子带间树形架构的系数对应关系,进而提出一种NSST域隐马尔可夫模树模型(C-NSSTHMT),该模型通过Cauchy分布来拟合NSST系数,更好地揭示图像NSST变换后相同尺度子带内和不同尺度子带间系数的相关性.进一步提出一种基于所提出C-NSST-HMT模型的图像去噪算法,该算法对于含噪声方差为30和40的噪声图像,其去噪后的PSNR(Peak Signal to Noise Ratio)较NSCT-HMT方法分别提高了1.995dB和1.193dB.特别对纹理和细节丰富的图像,该算法在去噪的同时,有效地保留了图像的几何信息.

可修复系统中具有耗散算子的抽象Cauchy问题解的适定性

研究了耗散算子及其共轭算子的性质,给出了具有耗散算子的抽象Cauchy问题解的适定性条件,指出此类问题解的适定性与耗散算子的共轭算子的预解式存在与否密切相关.

多帧背景差与Cauchy模型融合的目标检测

为有效解决复杂监视场景中快速、准确检测运动目标,提出一种多帧背景差与柯西(Cauchy)模型融合的目标检测方法。该方法首先借鉴Surendra背景模型的思路进行改进,采用多帧背景差法获取干净的背景图像,然后利用实时的视频图像和当前的背景图像进行绝对差分处理,最后通过Cauchy模型对整幅绝对差分图像上的点进行背景点和前景点判别,实现对复杂监视场景中目标的准确检测。针对车辆、行人等不同对象的监控场景下进行实验,验证了本文方法不仅能够有效地抑制噪声及伪目标的干扰,而且能够快速、准确地分割出前景目标。

对合Cauchy-Hadamard型MDS矩阵的构造

MDS矩阵和对合MDS矩阵在分组密码中有广泛应用。该文将考察同时是Hadamard矩阵和Cauchy矩阵的那些MDS矩阵,给出了这类矩阵的结构、构造方法和个数,从而得到了MDS矩阵一种新的构造方法。该文还证明了Cauchy-Hadamard型MDS矩阵都等效于对合的Cauchy-Hadamard型MDS矩阵,并给出了由Cauchy-Hadamard型MDS矩阵构造对合的Cauchy-Hadamard型MDS矩阵的方法。