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Stable and Total Fenchel Duality for Composed Convex Optimization Problems 被引量:4
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作者 Dong-hui FANG Xian-yun WANG 《Acta Mathematicae Applicatae Sinica》 SCIE CSCD 2018年第4期813-827,共15页
In this paper, we consider the composed convex optimization problem which consists in minimizing the sum of a convex function and a convex composite function. By using the properties of the epigraph of the conjugate f... In this paper, we consider the composed convex optimization problem which consists in minimizing the sum of a convex function and a convex composite function. By using the properties of the epigraph of the conjugate functions and the subdifferentials of convex functions, we give some new constraint qualifications which completely characterize the strong Fenchel duality and the total Fenchel duality for composed convex optimiztion problem in real locally convex Hausdorff topological vector spaces. 展开更多
关键词 Composed convex optimization problem constraint qualifications strong duality total duality
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Approximate Optimality Conditions for Composite Convex Optimization Problems 被引量:3
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作者 Xian-Jun Long Xiang-Kai Sun Zai-Yun Peng 《Journal of the Operations Research Society of China》 EI CSCD 2017年第4期469-485,共17页
The purpose of this paper is to study the approximate optimality condition for composite convex optimization problems with a cone-convex system in locally convex spaces,where all functions involved are not necessaril... The purpose of this paper is to study the approximate optimality condition for composite convex optimization problems with a cone-convex system in locally convex spaces,where all functions involved are not necessarily lower semicontinuous.By using the properties of the epigraph of conjugate functions,we introduce a new regularity condition and give its equivalent characterizations.Under this new regularity condition,we derive necessary and sufficient optimality conditions ofε-optimal solutions for the composite convex optimization problem.As applications of our results,we derive approximate optimality conditions to cone-convex optimization problems.Our results extend or cover many known results in the literature. 展开更多
关键词 Composite convex optimization problem Approximate optimality condition Generalized regularity condition ε-Subdifferential
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RECOVERY A POSTERIORI ERROR ESTIMATES FOR GENERAL CONVEX ELLIPTIC OPTIMAL CONTROL PROBLEMS SUBJECT TO POINTWISE CONTROL CONSTRAINTS 被引量:2
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作者 Yanping Chen Yao Fu +2 位作者 Huanwen Liu Yongquan Dai Huayi Wei 《Journal of Computational Mathematics》 SCIE CSCD 2009年第4期543-560,共18页
Superconvergence and recovery a posteriori error estimates of the finite element ap- proximation for general convex optimal control problems are investigated in this paper. We obtain the superconvergence properties of... Superconvergence and recovery a posteriori error estimates of the finite element ap- proximation for general convex optimal control problems are investigated in this paper. We obtain the superconvergence properties of finite element solutions, and by using the superconvergence results we get recovery a posteriori error estimates which are asymptotically exact under some regularity conditions. Some numerical examples are provided to verify the theoretical results. 展开更多
关键词 General convex optimal control problems Finite element approximation Control constraints SUPERCONVERGENCE Recovery operator.
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Recovery Type A Posteriori Error Estimates of Fully Discrete Finite Element Methods for General Convex Parabolic Optimal Control Problems 被引量:2
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作者 Yuelong Tang Yanping Chen 《Numerical Mathematics(Theory,Methods and Applications)》 SCIE 2012年第4期573-591,共19页
This paper is concerned with recovery type a posteriori error estimates of fully discrete finite element approximation for general convex parabolic optimal control problems with pointwise control constraints.The time ... This paper is concerned with recovery type a posteriori error estimates of fully discrete finite element approximation for general convex parabolic optimal control problems with pointwise control constraints.The time discretization is based on the backward Euler method.The state and the adjoint state are approximated by piecewise linear functions and the control is approximated by piecewise constant functions.We derive the superconvergence properties of finite element solutions.By using the superconvergence results,we obtain recovery type a posteriori error estimates.Some numerical examples are presented to verify the theoretical results. 展开更多
关键词 General convex optimal control problems fully discrete finite element approximation a posteriori error estimates SUPERCONVERGENCE recovery operator
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