DIRECT PERTURBATION METHOD FOR REANALYSIS OF MATRIX SINGULAR VALUE DECOMPOSITION

The perturbational reanalysis technique of matrix singular value decomposition is applicable to many theoretical and practical problems in mathematics, mechanics, control theory, engineering, etc.. An indirect perturbation method has previously been proposed by the author in this journal, and now the direct perturbation method has also been presented in this paper. The second-order perturbation results of non-repeated singular values and the corresponding left and right singular vectors are obtained. The results can meet the general needs of most problems of various practical applications. A numerical example is presented to demonstrate the effectiveness of the direct perturbation method.

PERTURBATION METHOD FOR REANALYSIS OF THE MATRIX SINGULAR VALUE DECOMPOSITION

The perturbation method for the reanalysis of the singular value decomposition (SVD) of general real matrices is presented in this paper. This is a simple but efficient reanalysis technique for the SVD, which is of great worth to enhance computational efficiency of the iterative analysis problems that require matrix singular value decomposition repeatedly. The asymptotic estimate formulas for the singular values and the corresponding left and right singular vectors up to second-order perturbation components are derived. At the end of the paper the way to extend the perturbation method to the case of general complex matrices is advanced.

Coupled Cross-correlation Neural Network Algorithm for Principal Singular Triplet Extraction of a Cross-covariance Matrix

This paper proposes a novel coupled neural network learning algorithm to extract the principal singular triplet(PST)of a cross-correlation matrix between two high-dimensional data streams. We firstly introduce a novel information criterion(NIC),in which the stationary points are singular triplet of the crosscorrelation matrix. Then, based on Newton's method, we obtain a coupled system of ordinary differential equations(ODEs) from the NIC. The ODEs have the same equilibria as the gradient of NIC, however, only the first PST of the system is stable(which is also the desired solution), and all others are(unstable)saddle points. Based on the system, we finally obtain a fast and stable algorithm for PST extraction. The proposed algorithm can solve the speed-stability problem that plagues most noncoupled learning rules. Moreover, the proposed algorithm can also be used to extract multiple PSTs effectively by using sequential method.

基于奇异值分解张拉整体结构找形方法

张拉整体结构是由一组不连续的受压单元包含于连续受拉单元组成的稳定自平衡结构,为了寻找自平衡状态下的构型,引入奇异值分解的方法,将寻找张拉整体结构的自平衡构型问题转化为最小奇异值的判定。通过广义节点坐标和构件之间的连接关系建立结构的数学模型;引入力密度的概念,对张拉整体结构进行受力分析,列写包含平衡矩阵的平衡方程;对平衡矩阵进行奇异值分解,利用分解获得的最小奇异值判断平衡方程是否有解,对张拉整体结构是否存在自平衡构型进行初步判定,再依据获得的力密度的均匀性(同组构件力密度大小相等)和正负属性(杆的力密度小于0,索的力密度大于0)对结构自平衡状态进一步判断;通过实例分析对该找形方法的可行性进行了验证,结果表明:该方法可以找到张拉整体结构自平衡构型。本文为寻找自平衡张拉整体结构提供了一种思路。

基于前后向矩阵束方法的线性排布无人机集群目标规模估算

利用前后向矩阵束方法,提出了一种有效的“蜂群”无人机群目标个数估计方法用于目标检测。与传统的参数估算方法相比,所提方法对于稀疏信号也能准确地进行估算。首先,在一定的角度或频率下,获取线阵排列群目标的雷达散射截面;然后,根据已知的雷达回波构造Hankel-Toeplitz矩阵,并对该矩阵进行奇异值分解;最后,通过设置合适的阈值选取比例较大的奇异值,以此准确地估算线阵排列群目标的个数。此外,文中还讨论了不同信噪比对估算结果的影响。为了提高精度,文中采用多组不同方位角度的回波信号来联合估算群目标的个数。仿真结果表明,该方法能够有效、准确地估算线阵排列群目标的个数,而且估计结果不受噪声的影响,具有较好的鲁棒性。

基于深度神经网络的存储压缩方法研究

由于深度神经网络存在内存密集和计算密集两大特征,其无法满足移动设备存储的需求。为此,提出一种基于深度神经网络的存储压缩方法,该方法通过SVD矩阵奇异值分解方法,并辅以网络剪枝技术,在深度神经网络运行过程中引入少量神经元,并设定神经元数连接数,降低权重规模。通过一系列方法对策,尽可能在不损失精度的前提下,对深度神经网络模型大幅度压缩,其压缩程度达到了5×、15×。

VARIABLE MESH FINITE DIFFERENCE METHOD FOR SELF-ADJOINT SINGULARLY PERTURBED TWO-POINT BOUNDARY VALUE PROBLEMS

A numerical method based on finite difference method with variable mesh is given for self-adjoint singularly perturbed two-point boundary value problems. To obtain parameter- uniform convergence, a variable mesh is constructed, which is dense in the boundary layer region and coarse in the outer region. The uniform convergence analysis of the method is discussed. The original problem is reduced to its normal form and the reduced problem is solved by finite difference method taking variable mesh. To support the efficiency of the method, several numerical examples have been considered.

Mobility and equilibrium stability analysis of pin-jointed mechanisms with equilibrium matrix SVD

Under certain load pattern, the geometrically indeterminate pin-jointed mechanisms will present certain shapes to keep static equalization. This paper proposes a matrix-based method to determine the mobility and equilibrium stability of mechanisms according to the effects of the external loads. The first and second variations of the potential energy function of mechanisms under conservative force field are analyzed. Based on the singular value decomposition (SVD) method, a new crite- rion for the mobility and equilibrium stability of mechanisms can be concluded by analyzing the equilibrium matrix. The mobility and stability of mechanisms can be classified by unified matrix formulae. A number of examples are given to demonstrate the proposed criterion. In the end, criteria are summarized in a table.

Approximate Solution of the Singular-Perturbation Problem on Chebyshev-Gauss Grid

Matrix methods, now-a-days, are playing an important role in solving the real life problems governed by ODEs and/or by PDEs. Many differential models of sciences and engineers for which the existing methodologies do not give reliable results, these methods are solving them competitively. In this work, a matrix methods is presented for approximate solution of the second-order singularly-perturbed delay differential equations. The main characteristic of this technique is that it reduces these problems to those of solving a system of algebraic equations, thus greatly simplifying the problem. The error analysis and convergence for the proposed method is introduced. Finally some experiments and their numerical solutions are given.

不规则三杆张拉整体结构的找形

为了获得不规则形态的张拉整体结构,本文提出了一种确定稳定构型的思路,即基于规则张拉整体结构在大部分构件长度不变的条件下,在一定范围内改变其个别构件长度,稳定状态时这些构件的长度最小。通过规则张拉整体结构单元稳定条件分析、非规则三杆张拉整体结构的稳定构型分析、求解思路分析几个方面的研究,获得了具体的构型方法,并通过具体数值求解、仿真分析和搭建实物模型等手段对此方法的正确性进行了验证,证明此方法求得的结构稳态数值的精度较高。为张拉整体结构基于构件变化的找形及机构化分析提供了一种思路。

基于双树复小波和奇异差分谱的齿轮故障诊断研究

针对齿轮故障振动信号的非平稳特性和包含强烈噪声,很难提取故障特征频率的情况,提出了基于双树复小波和奇异差分谱的故障诊断方法。首先将非平稳的故障振动信号通过双树复小波分解为几个不同频段的分量;由于噪声的影响,从各个分量的频谱中难以准确地得到故障频率。然后对包含故障特征的分量构建Hankel矩阵并进行奇异值分解,求奇异值差分谱曲线,确定奇异值个数进行SVD重构降噪,由此实现对故障特征信息的提取。最后再求希尔伯特包络谱,便能准确地得到故障频率。实验结果和工程应用表明,该方法可以有效地提取齿轮的故障特征信息,验证了方法的可行性和有效性。

基于EMD分解和奇异值差分谱理论的轴承故障诊断方法

针对故障轴承振动信号中含有强烈的背景噪声,难以提取故障频率的现实情况,提出了基于经验模态分解(Empirical Mode Decomposition,EMD)和奇异值差分谱的轴承故障诊断方法。首先通过EMD方法将非平稳的原始轴承振动信号分解成若干个平稳的本征模函数(Intrinsic Mode Function,IMF);由于背景噪声的影响,从各个IMF的频谱中难以准确地得到故障频率。对IMF分量构建Hankel矩阵并进行奇异值分解,进一步找到奇异值差分谱,根据奇异值差分谱理论对某个IMF分量进行消噪和重构,然后再求其频谱,便能准确地得到故障频率。实验结果表明,提出的方法能有效地应用于轴承的故障诊断。

多输入多输出线性定常系统稳定裕度的分析与改进

针对多输入多输出(MIMO)控制系统的稳定裕度求解问题,首先分析了现有的回差阵奇异值法这一计算方法,并得到其解决单输入单输出(SISO)系统的稳定裕度结论,在此基础上,提出两种基于系统回差阵的稳定裕度改进方法;一种是在有限条件下利用矩阵的特征值代替奇异值来建立与稳定裕度关系的策略,另一种是利用系统逆回差阵的行列式,通过求其奇异值来计算系统稳定裕度;最后结合工程实例,通过数值仿真验证两种稳定裕度计算方法相比原方法都有不同程度的改进,而且三种方法可以结合起来进行分析,最大化的减小系统稳定裕度结果的保守性.

特高压交流线路故障谐波分析

针对特高压线路典型分布参数特性,利用现代信号处理方法-最小二乘矩阵束法实时分析故障电流谐波。以1000 kV电压等级的输电线路为模型,用EMTP仿真建模,给出了最小二乘矩阵束法分析线路中间和末端发生单相接地和三相短路时的故障信号中的自由分量衰减特征。仿真结果表明,最小二乘矩阵束法以衰减指数函数为模型,能够快速、准确地计算出故障信号中的频率分布、相应的频率衰减时间常数以及含量。同时也给出了电科院1000 kV的动模波形和EMTP仿真波形的结果比较。动模分析结果表明,仿真模型合理,该方法很适合于暂态谐波分析,为分析暂态量对保护的影响提供指导意义。

基于局部优化奇异值分解和K-means聚类的协同过滤算法

为了克服传统协同过滤(CF)推荐方法数据稀疏和可扩展性差的不足,该文提出1种基于局部优化降维和聚类的协同过滤算法。采用局部优化的奇异值分解(SVD)降维技术和K-均值(K-means)聚类技术对用户-项目评分矩阵中的相似用户进行聚类并降低维度。利用近似差分矩阵表示评分矩阵的局部结构,实现局部优化。局部优化的SVD降维技术可以利用更少的迭代次数缓解CF中数据稀疏和算法可扩展性差的问题。K-means聚类技术可以缩小邻居集查找范围,提高推荐速度。将该文算法与基于Pearson相关系数的协同过滤算法、基于SVD的协同过滤算法、基于K-means聚类的协同过滤算法相比较。在MovieLens数据集上的实验结果表明,该算法的平均绝对误差(MAE)较其他算法降低了大约12%,准确性(Precision)提高了7%。

多变量飞控系统的稳定裕度分析

根据系统回差阵最小奇异值及通用相角－幅值裕度估算图，给出了在系统的输入和输出端所有通道的相角和幅值同时变化时系统的稳定裕度，它不仅可作为评价不同控制律鲁棒性优劣的指标之一，也是对古典单通道量测ＭＩＭＯ系统稳定裕度的补充。同时为了克服所得结果的保守性，采用了两种改进方法，并对某型飞机的侧向运动系统进行了稳定裕度的分析、比较。

采用SVD方法的附加阻尼控制器配置

为正确选择附加阻尼控制器的配置点,在建立多机电力系统传递函数矩阵的基础上采用奇异值分解的方法,给出了附加阻尼控制器配置点的评价指标。该评价指标与留数法评价指标具有一致性,通过求解传递函数矩阵的最大奇异值及其奇异向量来识别每台发电机对振荡模态的贡献程度,从而找出附加阻尼控制器的最佳配置点,简化了计算过程和运算量。为了获得复杂电力系统的传递函数,引入普罗尼分析的方法进行传递函数辨识,以给大规模电力系统在线模型辨识提供有利支持。最后将该方法应用于多机电力系统的PSS和SVC附加阻尼控制器配置点选择,分析获得其最佳配置点,验证了配置点的合理性。

奇异值分解用于图像置乱程度评价研究

提出了基于奇异值分解的图像置乱程度评价新方法。首先求置乱前后两图像灰度值差的绝对值矩阵;其次计算灰度差绝对值矩阵与其转置矩阵之积并进行奇异值分解;最后根据所得奇异值构造一个离散概率分布并计算其信息熵作为图像置乱程度评价函数。实验结果表明,所提出的评价方法能够较好地刻画图像的置乱程度,反映了加密次数与置乱程度之间的关系,与人的视觉基本相符。而且对于不同的图像,该评价方法能在一定程度上反映所用的置乱变换在各置乱阶段的效果。

基于TSVD和Hilbert变换的相位差测量方法及应用

针对工程应用中的信号缓变特性,提出截断奇异值分解(TSVD)和希尔伯特(Hilbert)变换联合使用的相位差计算方法。首先对离散的含噪一维信号分段并构成汉克尔(Hankel)矩阵,根据TSVD的奇异值依次降序排列的规律,用奇异熵变化量的拐点确定奇异谱阶次,使该阶次内的信号饱和度基本代替原信号。将降噪后的矩阵重构得到降噪后的信号,对降噪后的信号进行Hilbert变换计算两路信号的相位差。仿真分析及实测数据表明:该联合计算方法满足工程应用,且具有一定的通用性。

基于非局部双边随机投影低秩逼近图像去噪算法

该文提出一种基于非局部双边随机投影的低秩逼近图像去噪新方法。首先,对每个图像块通过非局部搜索寻找相似匹配块簇,然后对相似匹配块簇进行双边随机投影,用投影后的低秩结构恢复原图像。实验结果表明,所提方法比奇异值分解方法有较低的计算复杂度,比单边随机投影方法有较小的重构误差。特别是和3维块匹配方法相比,所提方法能保持相近的信噪比和较好的视觉质量。