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A Subspace Version of the Powell–Yuan Trust-Region Algorithm for Equality Constrained Optimization Geovani Nunes Grapiglia · Jin-Yun Yuan · Ya-Xiang Yuan Journal of the Operations Research Society of China    2013, 1 (4): 425-452.   DOI: 10.1007/s40305-013-0029-4 Abstract （1030）      PDF（pc） （6064KB）（2420）       Knowledge map    Save This paper studied subspace properties of the Celis–Dennis–Tapia (CDT) subproblem that arises in some trust-region algorithms for equality constrained optimization. The analysis is an extension of that presented by Wang and Yuan (Numer. Math. 104:241–269, 2006) for the standard trust-region subproblem. Under suitable conditions, it is shown that the trial step obtained from the CDT subproblem is in the subspace spanned by all the gradient vectors of the objective function and of the constraints computed until the current iteration. Based on this observation, a subspace version of the Powell–Yuan trust-region algorithm is proposed for equality constraithe number of variables. The convergence analysis is given and numerical results are also reported.ned optimization problems where the number of constraints is much lower than Related Articles | Metrics | Comments（0）

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On Bilevel Variational Inequalities ?Zhong-Ping Wan ·? Jia-Wei Chen Journal of the Operations Research Society of China    2013, 1 (4): 483-510.   DOI: 10.1007/s40305-013-0036-5 Abstract （484）      PDF（pc） （3829KB）（863）       Knowledge map    Save A class of bilevel variational inequalities (shortly (BVI)) with hierarchical nesting structure is firstly introduced and investigated. The relationship between (BVI) and some existing bilevel problems are presented. Subsequently, the existence of solution and the behavior of solution sets to (BVI) and the lower level variational inequality are discussed without coercivity. By using the penalty method, we transform (BVI) into one-level variational inequality, and establish the equivalence between (BVI) and the one-level variational inequality. A new iterative algorithm to compute the approximate solutions of (BVI) is also suggested and analyzed. The convergence of the iterative sequence generated by the proposed algorithm is derived under some mild conditions. Finally, some relationships among (BVI), system of variational inequalities and vector variational inequalities are also given. Related Articles | Metrics | Comments（0） Cited: Baidu(1)

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Optimal Control of Nonlinear Switched Systems: Computational Methods and Applications Qun Lin · Ryan Loxton · Kok Lay Teo Journal of the Operations Research Society of China    2013, 1 (3): 275-312.   DOI: 10.1007/s40305-013-0021-z Abstract （724）      PDF（pc） （1123KB）（638）       Knowledge map    Save A switched system is a dynamic system that operates by switching between different subsystems or modes. Such systems exhibit both continuous and discrete characteristics—a dual nature that makes designing effective control policies a challenging task. The purpose of this paper is to review some of the latest computational techniques for generating optimal control laws for switched systems with nonlinear dynamics and continuous inequality constraints.We discuss computational strategies for optimizing both the times at which a switched system switches from one mode to another (the so-called switching times) and the sequence in which a switched system operates its various possible modes (the so-called switching sequence). These strategies involve novel combinations of the control parameterization method, the timescaling transformation, and bilevel programming and binary relaxation techniques. We conclude the paper by discussing a number of switched system optimal control models arising in practical applications. Related Articles | Metrics | Comments（0） Cited: Baidu(20)

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Preface Li-Qun Qi · Zong-Ben Xu · Qing-Zhi Yang Journal of the Operations Research Society of China    2017, 5 (1): 1-.   DOI: 10.1007/s40305-017-0152-8 Abstract （12547）      PDF（pc） （2800KB）（622）       Knowledge map    Save Related Articles | Metrics | Comments（0）

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A New Stochastic Model for Classifying Flexible Measures in Data Envelopment Analysis Mansour Sharifi, Ghasem Tohidi, Behrouz Daneshian, Farzin Modarres Khiyabani Journal of the Operations Research Society of China    2021, 9 (3): 569-592.   DOI: 10.1007/s40305-020-00318-5 Abstract （4648）      PDF       Knowledge map    Save The way to deal with flexible data from their stochastic presence point of view as output or input in the evaluation of efficiency of the decision-making units (DMUs) motivates new perspectives in modeling and solving data envelopment analysis (DEA) in the presence of flexible variables. Because the orientation of flexible data is not pre-determined, and because the number of DMUs is fixed and all the DMUs are independent, flexible data can be treated as random variable in terms of both input and output selection. As a result, the selection of flexible variable as input or output for n DMUs can be regarded as binary random variable. Assuming the randomness of choosing flexible data as input or output, we deal with DEA models in the presence of flexible data whose input or output orientation determines a binomial distribution function. This study provides a new insight to classify flexible variable and investigates the input or output status of a variable using a stochastic model. The proposed model obviates the problems caused by the use of the large M number and using its different values in previous models. In addition, it can obtain the most appropriate efficiency value for decision-making units by assigning the chance of choosing the orientation of flexible variable to the model itself. The proposed method is compared with other available methods by employing numerical and empirical examples. Reference | Related Articles | Metrics | Comments（0）

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Online Learning over a Decentralized Network Through ADMM Hao-Feng Xu · Qing Ling · Alejandro Ribeiro Journal of the Operations Research Society of China    2015, 3 (4): 537-.   DOI: 10.1007/s40305-015-0104-0 Abstract （846）      PDF（pc） （765KB）（581）       Knowledge map    Save In this paper, we focus on the decentralized online learning problem where online data streams are separately collected and collaboratively processed by a network of decentralized agents. Comparing to centralized batch learning, such a framework is faithful to the decentralized and online natures of the data streams. We propose an online decentralized alternating direction method of multipliers that efficiently solves the online learning problem over a decentralized network.We prove its O(√T ) regret bound when the instantaneous local cost functions are convex, and its O(log T ) regret bound when the instantaneous local cost functions are strongly convex, where T is the number of iterations. Both regret bounds are in the same orders as those of centralized online learning. Numerical experiments on decentralized online least squares and classification problems demonstrate effectiveness of the proposed algorithm. Related Articles | Metrics | Comments（0） Cited: Baidu(3)

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A New Analysis on the Barzilai-Borwein Gradient Method Yu-Hong Dai Journal of the Operations Research Society of China    2013, 1 (2): 187-.   DOI: DOI10.1007/s40305-013-0007-x Abstract （299）      PDF（pc） （3282KB）（544）       Knowledge map    Save Due to its simplicity and efficiency, the Barzilai and Borwein (BB) gradient method has received various attentions in different fields. This paper presents a new analysis of the BB method for two-dimensional strictly convex quadratic functions. The analysis begins with the assumption that the gradient norms at the first two iterations are fixed. We show that there is a superlinear convergence step in at most three consecutive steps. Meanwhile, we provide a better convergence relation for the BB method. The influence of the starting point and the condition number to the convergence rate is comprehensively addressed. Related Articles | Metrics | Comments（0） Cited: Baidu(36)

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Approximation Algorithms for Discrete Polynomial Optimization Si-Mai He · Zhe-Ning Li · Shu-Zhong Zhang Journal of the Operations Research Society of China    2013, 1 (1): 3-.   Abstract （433）      PDF（pc） （1021KB）（479）       Knowledge map    Save In this paper, we consider approximation algorithms for optimizing a generic multivariate polynomial function in discrete (typically binary) variables. Such models have natural applications in graph theory, neural networks, error-correcting codes, among many others. In particular, we focus on three types of optimization models: (1) maximizing a homogeneous polynomial function in binary variables; (2) maximizing a homogeneous polynomial function in binary variables, mixed with variables under spherical constraints; (3) maximizing an inhomogeneous polynomial function in binary variables. We propose polynomial-time randomized approximation algorithms for such polynomial optimization models, and establish the approximation ratios (or relative approximation ratios whenever appropriate) for the proposed algorithms. Some examples of applications for these models and algorithms are discussed as well. Related Articles | Metrics | Comments（0） Cited: Baidu(24)

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New Bounds for RIC in Compressed Sensing Sheng-Long Zhou · Ling-Chen Kong · Nai-Hua Xiu Journal of the Operations Research Society of China    2013, 1 (2): 227-.   DOI: DOI10.1007/s40305-013-0013-z Abstract （230）      PDF（pc） （3317KB）（401）       Knowledge map    Save This paper gives new bounds for restricted isometry constant (RIC) in compressed sensing. Let Φ be an m×n real matrix and k be a positive integer with k  n. The main results of this paper show that if the restricted isometry constant of Φ satisfies δ8ak < 1 and some other conditions , then k-sparse solution can be recovered exactly via l1 minimization in the noiseless case. In particular, when a = 1, 1.5, 2 and 3, we have δ2k < 0.5746 and δ8k < 1, or δ2.5k < 0.7046 and δ12k < 1, or δ3k < 0.7731 and δ16k < 1 or δ4k < 0.8445 and δ24k < 1. Related Articles | Metrics | Comments（0） Cited: Baidu(25)

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Complexities of Some Problems on Multi-agent Scheduling on a Single Machine Jin-Jiang Yuan Journal of the Operations Research Society of China    2016, 4 (3): 379-.   Abstract （9890）      PDF       Knowledge map    Save We study the computational complexities of three problems on multi-agent scheduling on a single machine. Among the three problems, the computational complexities of the first two problems were still open and the last problem was shown to be unary NP-hard in the literature. We show in this paper that the first two problems are unary NP-hard. We also show that the unary NP-hardness proof for the last problem in the literature is invalid, and so, the exact complexity of the problem is still open. Related Articles | Metrics | Comments（0） Cited: Baidu(138)

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Approximation Algorithms for Stochastic Combinatorial Optimization Problems Jian Li· Yu Liu Journal of the Operations Research Society of China    2016, 4 (1): 1-.   DOI: 10.1007/s40305-015-0116-9 Abstract （15808）      PDF       Knowledge map    Save Stochastic optimization has established itself as a major method to handle uncertainty in various optimization problems by modeling the uncertainty by a probability distribution over possible realizations. Traditionally, the main focus in stochastic optimization has been various stochastic mathematical programming (such as linear programming, convex programming). In recent years, there has been a surge of interest in stochastic combinatorial optimization problems from the theoretical computer science community. In this article, we survey some of the recent results on various stochastic versions of classical combinatorial optimization problems. Since most problems in this domain are NP-hard (or #P-hard, or even PSPACE-hard), we focus on the results which provide polynomial time approximation algorithms with provable approximation guarantees. Our discussions are centered around a few representative problems, such as stochastic knapsack, stochastic matching, multi-armed bandit etc. We use these examples to introduce several popular stochastic models, such as the fixed-set model, 2-stage stochastic optimization model, stochastic adaptive probing model etc, as well as some useful techniques for designing approximation algorithms for stochastic combinatorial optimization problems, including the linear programming relaxation approach, boosted sampling, content resolution schemes, Poisson approximation etc.We also provide some open research questions along the way. Our purpose is to provide readers a quick glimpse to the models, problems, and techniques in this area, and hopefully inspire new contributions . Related Articles | Metrics | Comments（0） Cited: Baidu(4)

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Two-Phase-SQP Method with Higher-Order Convergence Property Suvra Kanti Chakraborty， Geetanjali Panda Journal of the Operations Research Society of China    2016, 4 (3): 385-.   DOI: 10.1007/s40305-016-0122-6 Abstract （10029）      PDF       Knowledge map    Save We propose a two-phase-SQP (Sequential Quadratic Programming) algorithm for equality-constrained optimization problem. In this paper, an iteration process is developed, and at each iteration, two quadratic sub-problems are solved. It is proved that, under some suitable assumptions and without computing further higher-order derivatives, this iteration process achieves higher-order local convergence property in comparison to Newton-SQP scheme. Theoretical advantage and a note on l1 merit function associated to the method are provided. Related Articles | Metrics | Comments（0） Cited: Baidu(2)

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A Full Nesterov-Todd Step FeasibleWeighted Primal-Dual Interior-Point Algorithm for Symmetric Optimization Behrouz Kheirfam Journal of the Operations Research Society of China    2013, 1 (4): 467-482.   DOI: 10.1007/s40305-013-0032-9 Abstract （751）      PDF（pc） （3348KB）（336）       Knowledge map    Save In this paper a weighted short-step primal-dual interior-point algorithm for linear optimization over symmetric cones is proposed that uses new search directions. The algorithm uses at each interior-point iteration a full Nesterov-Todd step and the strategy of the central path to obtain a solution of symmetric optimization. We establish the iteration bound for the algorithm, which matches the currently best-known iteration bound for these methods, and prove that the algorithm is quadratically convergent. Related Articles | Metrics | Comments（0） Cited: Baidu(8)

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Alternating Direction Method of Multipliers for Linear Programming Bing-Sheng He· Xiao-Ming Yuan Journal of the Operations Research Society of China    2016, 4 (4): 425-.   DOI: 10.1007/s40305-016-0136-0 Abstract （9803）      PDF       Knowledge map    Save Linear programming is the core problem of various operational research problems. The dominant approaches for linear programming are simplex and interior point methods. In this paper, we showthat the alternating direction method of multipliers (ADMM), which was proposed long time ago while recently found more and more applications in a broad spectrum of areas, can also be easily used to solve the canonical linear programming model. The resulting per-iteration complexity is O(mn) where m is the constraint number and n the variable dimension. At each iteration, there are m subproblems that are eligible for parallel computation; each requiring only O(n) flops. There is no inner iteration as well.We thus introduce the newADMMapproach to linear programming, which may inspire deeper research for more complicated scenarios with more sophisticated results. Related Articles | Metrics | Comments（0）

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Dynamic Pricing with Stochastic Reference Price Effect Xin Chen, Zhen-Yu Hu, Yu-Han Zhang Journal of the Operations Research Society of China    2019, 7 (1): 107-125.   DOI: 10.1007/s40305-018-0227-1 Abstract （540）      PDF       Knowledge map    Save We study a dynamic pricing problem of a firm facing stochastic reference price effect. Randomness is incorporated in the formation of reference prices to capture either consumers' heterogeneity or exogenous factors that affect consumers' memory processes. We apply the stochastic optimal control theory to the problem and derive an explicit expression for the optimal pricing strategy. The explicit expression allows us to obtain the distribution of the steady-state reference price. We compare the expected steadystate reference price to the steady-state reference price in a model with deterministic reference price effect, and we find that the former one is always higher. Our numerical study shows that the two steady-state reference prices can have opposite sensitivity to the problem parameters and the relative difference between the two can be very significant. Reference | Related Articles | Metrics | Comments（0）

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A Review on Deep Learning in Medical Image Reconstruction Hai-Miao Zhang, Bin Dong Journal of the Operations Research Society of China    2020, 8 (2): 311-340.   DOI: 10.1007/s40305-019-00287-4 Abstract （795）      PDF       Knowledge map    Save Medical imaging is crucial in modern clinics to provide guidance to the diagnosis and treatment of diseases. Medical image reconstruction is one of the most fundamental and important components of medical imaging, whose major objective is to acquire high-quality medical images for clinical usage at the minimal cost and risk to the patients. Mathematical models in medical image reconstruction or, more generally, image restoration in computer vision have been playing a prominent role. Earlier mathematical models are mostly designed by human knowledge or hypothesis on the image to be reconstructed, and we shall call these models handcrafted models. Later, handcrafted plus data-driven modeling started to emerge which still mostly relies on human designs, while part of the model is learned from the observed data. More recently, as more data and computation resources are made available, deep learning based models (or deep models) pushed the data-driven modeling to the extreme where the models are mostly based on learning with minimal human designs. Both handcrafted and data-driven modeling have their own advantages and disadvantages. Typical handcrafted models are well interpretable with solid theoretical supports on the robustness, recoverability, complexity, etc., whereas they may not be flexible and sophisticated enough to fully leverage large data sets. Data-driven models, especially deep models, on the other hand, are generally much more flexible and effective in extracting useful information from large data sets, while they are currently still in lack of theoretical foundations. Therefore, one of the major research trends in medical imaging is to combine handcrafted modeling with deep modeling so that we can enjoy benefits from both approaches. The major part of this article is to provide a conceptual review of some recent works on deep modeling from the unrolling dynamics viewpoint. This viewpoint stimulates new designs of neural network architectures with inspirations from optimization algorithms and numerical differential equations. Given the popularity of deep modeling, there are still vast remaining challenges in the field, as well as opportunities which we shall discuss at the end of this article. Reference | Related Articles | Metrics | Comments（0）

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Recent Advances in Mathematical Programming with Semi-continuous Variables and Cardinality Constraint Xiao-Ling Sun · Xiao-Jin Zheng · Duan Li Journal of the Operations Research Society of China    2013, 1 (1): 55-.   Abstract （470）      PDF（pc） （742KB）（301）       Knowledge map    Save Mathematical programming problems with semi-continuous variables and cardinality constraint have many applications, including production planning, portfolio selection, compressed sensing and subset selection in regression. This class of problems can be modeled as mixed-integer programs with special structures and are in general NP-hard. In the past few years, based on new reformulations, approximation and relaxation techniques, promising exact and approximate methods have been developed. We survey in this paper these recent developments for this challenging class of mathematical programming problems. Related Articles | Metrics | Comments（0） Cited: Baidu(21)

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Convergence of a Class of Stationary Iterative Methods for Saddle Point Problems Yin Zhang Journal of the Operations Research Society of China    2019, 7 (2): 195-204.   DOI: 10.1007/s40305-019-00249-w Abstract （412）      PDF       Knowledge map    Save A unified convergence theory is derived for a class of stationary iterative methods for solving linear equality constrained quadratic programs or saddle point problems. This class is constructed from essentially all possible splittings of the submatrix residing in the (1,1)-block of the augmented saddle point matrix that would produce non-expansive iterations. The classic augmented Lagrangian method and alternating direction method of multipliers are two special members of this class. Reference | Related Articles | Metrics | Comments（0） Cited: Baidu(10)

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A Modified Proximal Gradient Method for a Family of Nonsmooth Convex Optimization Problems Ying-Yi Li · Hai-Bin Zhang· Fei Li Journal of the Operations Research Society of China    2017, 5 (3): 391-.   DOI: 10.1007/s40305-017-0155-5 Abstract （9892）      PDF       Knowledge map    Save In this paper, we propose a modified proximal gradient method for solving a class of nonsmooth convex optimization problems, which arise in many contemporarystatistical and signal processing applications. The proposed method adopts a new scheme to construct the descent direction based on the proximal gradient method. It is proven that the modified proximal gradient method is Q-linearly convergent without the assumption of the strong convexity of the objective function. Some numerical experiments have been conducted to evaluate the proposed method eventually. Related Articles | Metrics | Comments（0）

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Successive Partial-Symmetric Rank-One Algorithms for Almost Unitarily Decomposable Conjugate Partial-Symmetric Tensors Tao-Ran Fu, Jin-Yan Fan Journal of the Operations Research Society of China    2019, 7 (1): 147-167.   DOI: 10.1007/s40305-018-0194-6 Abstract （514）      PDF       Knowledge map    Save In this paper, we introduce the almost unitarily decomposable conjugate partial-symmetric tensors, which are different from the commonly studied orthogonally decomposable tensors by involving the conjugate terms in the decomposition and the perturbation term. We not only show that successive rank-one approximation algorithm exactly recovers the unitary decomposition of the unitarily decomposable conjugate partial-symmetric tensors. The perturbation analysis of successive rank-one approximation algorithm for almost unitarily decomposable conjugate partial-symmetric tensors is also provided to demonstrate the robustness of the algorithm. Reference | Related Articles | Metrics | Comments（0）