求解线性不等式组的方法

本提出了一个新的求解线性不等式组可行解的方法－－无约束极值方法。通过在线性不等式组的非空可行域的相对内域上建立一个非线性极值问题，根据对偶关系，得到了一个对偶空间的无约束极值及原始，对偶变量之间的简单线性映射关系，这样将原来线性不等式组问题的求解转化为一个无约束极值问题。中主要讨论了求解无约束极值问题的共轭梯度算法。同时，在寻找不等式组可行解的过程中，定义了穿越方向，这样大大减少计算量。中最后数值实验结果表明此算法是有效的。     

基于动力系统的线性不等式组的解法

本文提出了一种新的求解线性不等式组可行解的方法-基于动力系统的方法．假设线性不等式组的可行域为非空,在可行域的相对内域上建立一个非线性关系表达式,进而得到一个结构简单的动力系统模型．同时,定义了穿越方向。文章最后的数值实验结果表明此算法是有效的．     

线性不等式组的简单对偶非线性方法

将线性不等式组问题转化为一个形式简单的对偶空间非线性极值问题,本提出了一类新的求解线性不等式组的方法-简单对偶非线性方法,它在理论上是多项式算法,并可以从任意点启动,可以应用共轭梯度方法有效地求解大规模线性不等式组问题。本给出了不同的算法实现,数值实验结果表明,简单对偶非线性方法是有效的。     

线性半向量二层规划问题的全局优化方法

研究了线性半向量二层规划问题的全局优化方法. 利用下层问题的对偶间隙构造了线性半向量二层规划问题的罚问题, 通过分析原问题的最优解与罚问题可行域顶点之间的关系, 将线性半向量二层规划问题转化为有限个线性规划问题, 从而得到线性半向量二层规划问题的全局最优解. 数值结果表明所设计的全局优化方法对线性半向量二层规划问题是可行的.     

具有addition-Lukasiewicz型合成算子的模糊关系不等式及其约束规划

本文主要研究了具有addition-Lukasiewicz合成算子的模糊关系不等式及其约束的线性目标规划问题。首先,简单介绍了Lukasiewicz算子的实际应用背景及构建的优化模型。然后,给出了关于该类不等式的极大解的充分必要条件。在addition-min模糊关系不等式约束规划问题研究基础上,提出了与addition-Lukasiewicz模糊关系不等式组等价的线性系统,并给出了理论证明。对于该约束下的线性目标规划,只需解决一个线性规划问题,就可以得到一个原始优化问题的最优解。数例与数值实验验证了算法的有效性。     

第一阶段原有单纯形和对偶单纯形算法的计算比较

线性最优化广泛应用于经济与管理的各个领域.在线性规划问题的求解中,如果一个初始基本可行解没有直接给出,则常采用经典的两阶段法求解.对含有"≥"不等式约束的线性规划问题,讨论了第一阶段原有单纯形法和对偶单纯形法两种算法形式,并根据第一阶段问题的特点提出了改进的对偶单纯形枢轴准则.最后,通过大规模数值试验对两种算法进行计算比较,结果表明,改进后的对偶单纯形算法在计算效率上明显优于原有单纯形算法.     

简单的线性规划

1　重难点分析本单元要求了解二元一次不等式表示的是直线一侧的平面区域 ,能够具体画出二元一次不等式(组 )所表示的平面区域 ,了解线性规划的意义及线性约束条件、线性目标函数、可行解、可行域、最优解等基本概念 ,了解线性规划问题的图解法 ,能用图解法求最优解及线性目标函数的最大值或最小值 ,能用线性规划的方法解决实际生活中简单的最优问题 ,培养提高对实际问题进行探索分析研究的能力 .本单元的重点是二元一次不等式表示的平面区域和解线性规划问题的图解法 .难点之一是确定二元一次不等式的解表示的是直线的哪一侧区域 ,解决此难…     

用基础解系解某些条件极值问题

通过对线性的目标函数在线性的约束条件下的极值问题的分析,得到这类极值问题一般是不能用拉格朗日乘数法求解.通过用基础解系的方法进行求解这类问题,实例表明,这种方法是可行有效的.     

双层线性规划的一个全局优化方法

用线性规划对偶理论分析了双层线性规划的最优解与下层问题的对偶问题可行域上极点之间的关系，通过求得下层问题的对偶问题可行域上的极点，将双层线性规划转化为有限个线性规划问题，从而用线性规划方法求得问题的全局最优解．由于下层对偶问题可行域上只有有限个极点，所以方法具有全局收敛性．     

构造向量巧解线性规划问题

二元线性规划问题是高中数学一个重要内容,属不等式范畴,其基本方法是数形结合,即根据线性约束条件在坐标平面中作出可行域,通过对目标函数图像的研究,得到目标函数的最优解.高中数学简单的线性规划深刻体现了数形结合的数学思想方法,与其他知识点很容易形成交汇,在解决取值范围、最值等方面有很好应用,因而成为高考命题的一个热点,并多以选择、填空题出现.     

非线性不等式约束最优化问题一个新的广义既约梯度法

本文借助一种新的求基转轴运算建立了带非线性不等式约束最优化问题的一个新的广义既约梯度法．算法不引入任何松驰变量，以致扩大问题的规模，也不需对约束函数和变量的界预先估计．另一重要特点是方法不再使用隐函数理论确定搜索方向，而是由简单的显式给出．因此方法计算量小，结构简单，便于应用．对于非Ｋ—Ｔ点ｘ，我们构造的方向为可行下降的．本文证明了算法具有全局收敛性．     

Entropic perturbation method for solving a system of linear inequalities

The problem of finding an $\text{x∈}\text{R}{}^{\mathrm{n}}$ such that Ax⩽b and x⩾0 arises in numerous contexts. We propose a new optimization method for solving this feasibility problem. After converting Ax⩽b into a system of equations by introducing a slack variable for each of the linear inequalities, the method imposes an entropy function over both the original and the slack variables as the objective function. The resulting entropy optimization problem is convex and has an unconstrained convex dual. If the system is consistent and has an interior solution, then a closed-form formula converts the dual optimal solution to the primal optimal solution, which is a feasible solution for the original system of linear inequalities. An algorithm based on the Newton method is proposed for solving the unconstrained dual problem. The proposed algorithm enjoys the global convergence property with a quadratic rate of local convergence. However, if the system is inconsistent, the unconstrained dual is shown to be unbounded. Moreover, the same algorithm can detect possible inconsistency of the system. Our numerical examples reveal the insensitivity of the number of iterations to both the size of the problem and the distance between the initial solution and the feasible region. The performance of the proposed algorithm is compared to that of the surrogate constraint algorithm recently developed by Yang and Murty. Our comparison indicates that the proposed method is particularly suitable when the number of constraints is larger than that of the variables and the initial solution is not close to the feasible region.     

一种求解合作博弈最公平核心的非精确平行分裂算法

针对合作博弈核心和Shapley值的特点, 将最公平核心问题转化为带有两个变 量的可分离凸优化问题, 引入结构变分不等式的算子分裂方法框架, 提出了求解最公平核心的一种非精确平行分裂算法. 而且, 该算法充分利用了所求解问题的可行域的简单闭凸性, 子问题的非精确求解是容易的. 最后, 简单算例的数值实验表明了算法的收敛性和有效性.     

Search for feasible solutions by interior point algorithms

A family of interior point algorithms for linear programming problems is considered. In these algorithms, entering the feasible solution region of the original problem is presented as an optimization process of an extended problem. This extension is performed by adding a new variable. The main objective of the paper is a theoretical justification of the procedure of entering the feasible region of the original problem under the assumption of non-degeneracy of the extended problem. Specifically, it is proved that under consistent constraints of the original problemthe procedure leads to a relative interior point of the feasible region.     

Relaxations and discretizations for the pooling problem

The pooling problem is a folklore NP-hard global optimization problem that finds applications in industries such as petrochemical refining, wastewater treatment and mining. This paper assimilates the vast literature on this problem that is dispersed over different areas and gives new insights on prevalent techniques. We also present new ideas for computing dual bounds on the global optimum by solving high-dimensional linear programs. Finally, we propose discretization methods for inner approximating the feasible region and obtaining good primal bounds. Valid inequalities are derived for the discretized models, which are formulated as mixed integer linear programs. The strength of our relaxations and usefulness of our discretizations is empirically validated on random test instances. We report best known primal bounds on some of the large-scale instances.     

Parallel algorithms for large-scale linearly constrained minimization problem

In this paper, two PVD-type algorithms are proposed for solving inseparable linear constraint optimization. Instead of computing the residual gradient function, the new algorithm uses the reduced gradients to construct the PVD directions in parallel computation, which can greatly reduce the computation amount each iteration and is closer to practical applications for solve large-scale nonlinear programming. Moreover, based on an active set computed by the coordinate rotation at each iteration, a feasible descent direction can be easily obtained by the extended reduced gradient method. The direction is then used as the PVD direction and a new PVD algorithm is proposed for the general linearly constrained optimization. And the global convergence is also proved.     

A conjugate gradient algorithm for sparse linear inequalities

This paper presents a conjugate gradient method for solving systems of linear inequalities. The method is of dual optimization type and consists of two phases which can be implemented in a common framework. Phase 1 either finds the minimum-norm solution of the system or detects the inconsistency of the system. In the latter event, the method proceeds to Phase 2 in which an approximate least-squares solution to the system is obtained. The method is particularly suitable to large scale problems because it preserves the sparsity structure of the problem. Its efficiency is shown by computational comparisons with an SOR type method.