On the Regularized Lagrange Principle in Iterative Form and its Application for Solving Unstable Problems

F. A. Kuterin; M. I. Sumin

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On the Regularized Lagrange Principle in Iterative Form and its Application for Solving Unstable Problems

机译：论迭代形式的正规拉格朗日原理及其解决方案解决不稳定问题

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For a convex programming problem in a Hilbert space with operator equality constraints, the Lagrange principle in sequential nondifferential form or, in other words, the regularized Lagrange principle in iterative form, that is resistant to input data errors is proved. The possibility of its applicability for direct solving unstable inverse problems is discussed. As an example of such problem, we consider the problem of finding the normal solution of the Fredholm integral equation of the first kind. The results of the numerical calculations are shown.

机译：对于具有操作员平等约束的Hilbert空间中的凸编程问题，证明了序列非异常形式的Lagrange原理，或者换句话说，换句话说，迭代形式的正则拉格朗日原理是抗迭代形式的，这是对输入数据错误的抗迭代形式。讨论了它用于直接解决不稳定逆问题的适用性的可能性。作为这样的问题的示例，我们考虑找到第一类Fredholm积分方程的正常解的问题。显示了数值计算的结果。

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来源
《Mathematical models and computer simulations》 |2017年第3期|共11页
作者
F. A. Kuterin; M. I. Sumin;
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作者单位

Lobachevsky State University Nizhny Novgorod Russia;

Lobachevsky State University Nizhny Novgorod Russia;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Lagrange principle; Kuhn-Tucker theorem; instability; sequential optimization; duality; dual regularization; iterative algorithm; solving unstable problems;

机译：拉格朗日原则;Kuhn-tucker定理;不稳定;顺序优化;二元性;双正则化;迭代算法;解决不稳定的问题;

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1. On the regularized Lagrange principle in iterative form and its application for solving unstable problems [J] . F. A. Kuterin, M. I. Sumin Mathematical models and computer simulations . 2017,第3期

机译：论迭代形式的正规拉格朗日原理及其解决方案解决不稳定问题
2. Stable iterative Lagrange principle in convex programming as a tool for solving unstable problems [J] . Kuterin F. A., Sumin M. I. Computational mathematics and mathematical physics . 2017,第1期

机译：凸编程中稳定的迭代拉格朗日原理作为解决不稳定问题的工具
3. AUXILIARY PRINCIPLE TECHNIQUES AND MODIFIED PREDICTOR-CORRECTOR ITERATIVE ALGORITHMS FOR SOLVING GENERAL REGULARIZED NONCONVEX VARIATIONAL INEQUALITIES [J] . Balooee Javad, Cho Yeol Je Journal of nonlinear and convex analysis . 2017,第3期

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4. Comparison of Direct and Iterative Sparse Linear Solvers for Power System Applications on Parallel Computing Platforms [C] . Jean-Charles Tournier, Vaibhav Donde, Zhao Li Power systems computation conference;PSCC 2011 Stockholm . 2012

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5. Sparse multivariate analyses via ell1-regularized optimization problems solved with Bregman iterative techniques. [D] . Rohrbacker, Nicholas. 2012

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On the Regularized Lagrange Principle in Iterative Form and its Application for Solving Unstable Problems

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