The size of the smallest structured destabilizing perturbation for a linear time-invariant system can be calculated via the structured singular value (/spl mu/). The function /spl mu/ can be bounded above by the solution of a convex optimization problem, and in general there is a gap between /spl mu/ and the convex bound. This paper gives an alternative characterization of /spl mu/ which is used to study this gap for low-rank matrices. The low-rank characterization provides an easily computed bound which can potentially be significantly better than the standard convex bound. This is used to find new examples with larger gaps than previously known.
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机译:可以通过结构奇异值(/ spl mu /)计算线性时不变系统的最小结构化不稳定扰动的大小。函数/ spl mu /可以由凸优化问题的解决方案限定在上面,并且通常/ spl mu /与凸约束之间存在间隙。本文提供了/ spl mu /的替代特征,用于研究低秩矩阵的这一差距。低秩特征提供了易于计算的边界,该边界可能比标准凸边界好得多。这用于查找与以前已知的差距更大的新示例。
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