On the rank minimization problem over a positive semidefinitelinear matrix inequality

Mesbahi M.; Papavassilopoulos G.P.

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On the rank minimization problem over a positive semidefinitelinear matrix inequality

机译：半正定线性矩阵不等式上的秩最小化问题

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We consider the problem of minimizing the rank of a positive semidefinite matrix, subject to the constraint that an affine transformation of it is also positive semidefinite. Our method for solving this problem employs ideas from the ordered linear complementarity theory and the notion of the least element in a vector lattice. This problem is of importance in many contexts, for example in feedback synthesis problems, and such an example is also provided

机译：我们考虑最小化正半定矩阵的秩的问题，但要受其仿射变换也是正半定的约束。我们解决这个问题的方法采用了有序线性互补理论和向量晶格中最少元素的概念。这个问题在许多情况下都很重要，例如在反馈综合问题中，并且也提供了这样的示例

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《IEEE Transactions on Automatic Control》 |1997年第2期|p.239-243|共5页
作者
Mesbahi M.; Papavassilopoulos G.P.;
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正文语种 eng
中图分类自动化系统;
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control system synthesis; eigenvalues and eigenfunctions; feedback; matrix algebra; minimisation; MIN RANK problem; eigenvalues; least element theory; linear matrix inequality; ordered linear complementarity; output feedback synthesis; positive semidefinite matrix;

机译：控制系统综合;特征值和特征函数;反馈;矩阵代数;最小化;MIN RANK问题;特征值;最小元素理论;线性矩阵不等式;有序线性互补;输出反馈综合;正半定矩阵;

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专利

1. On the rank minimization problem over a positive semidefinite linear matrix inequality [J] . Mesbahi M., Papavassilopoulos G.P. IEEE Transactions on Automatic Control . 1997,第2期

机译：半正定线性矩阵不等式上的秩最小化问题
2. A Note on a Lower Bound on the Minimum Rank of a Positive Semidefinite Hankel Matrix Rank Minimization Problem [J] . Yi Xu, Xiaorong Ren, Xihong Yan Mathematical Problems in Engineering: Theory, Methods and Applications . 2021,第a期

机译：关于较低级别的较低级别的备注级别的较低级别的较低级别最小化问题
3. Exact recovery low-rank matrix via transformed affine matrix rank minimization [J] . Cui Angang, Peng Jigen, Li Haiyang Neurocomputing . 2018,第NOVa30期

机译：通过变换仿射矩阵秩最小化的精确恢复低秩矩阵
4. Linear Matrix Inequality Method for a Quadratic Performance Index Minimization Problem with a class of Bilinear Matrix Inequality Conditions [C] . M Tanemura, Y Chida International Conference on Motion and Vibration Control . 2016

机译：线性矩阵不等式方法，用于二次性能指数最小化问题与一类Bilinear矩阵不等式条件
5. Matrix rank minimization with applications. [D] . Fazel Sarjoui, Maryam. 2002

机译：矩阵排名最小化与应用程序。
6. Positive Semidefinite Rank-based Correlation Matrix Estimation with Application to Semiparametric Graph Estimation [O] . Tuo Zhao, Kathryn Roeder, Han Liu -1

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7. Positive Semidefinite Matrix Factorization: A Connection With Phase Retrieval and Affine Rank Minimization [O] . Dana Lahat, Yanbin Lang, Vincent Y. F. Tan, 2021

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On the rank minimization problem over a positive semidefinitelinear matrix inequality

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