| 引用本文: | 赵克友.二次曲线极点区域与H2性能约束下不确定系统的参数摄动界*[J].控制理论与应用,1998,15(4):615~619.[点击复制] |
| ZHAO Keyou.Parametric Perturbation Bounds for Uncertain Systemswith Quadric-Curve Pole Location and H2 Performance Constraints[J].Control Theory and Technology,1998,15(4):615~619.[点击复制] |
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| 二次曲线极点区域与H2性能约束下不确定系统的参数摄动界* |
| Parametric Perturbation Bounds for Uncertain Systemswith Quadric-Curve Pole Location and H2 Performance Constraints |
| 摘要点击 620 全文点击 384 投稿时间:1996-11-04 修订日期:1997-09-01 |
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| DOI编号 |
| 1998,15(4):615-619 |
| 中文关键词 极点分布 H2性能 鲁棒性 非线性摄动 状态空间模型 |
| 英文关键词 pole location H2 performance robustness nonlinear perturbation state space models |
| 基金项目 |
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| 中文摘要 |
| 考虑极点囿于二次曲线所围成的区域且H2性能小于某给定容限下线性不确定系统的参数最大摄动区域,系统由状态空间模型描述且非线性依赖摄动参量. 本文将给出参量的最大摄动区间的计算公式(对单参数情况),和最大摄动圆盘的算法(对两参数情况). 并指出极点分布鲁棒性与H2性能鲁棒性在原理上的相似性. |
| 英文摘要 |
| Consider the maximal perturbation region for linear continuous-time uncertain systems with quadric-curve pole location and H2 performance constraints; the systems are described by state space models which depend nonlinearly on some perturbation parameters. This paper will give formulas for calculating the maximal parametric perturbation interval (in single parameter cases) and algorithm for calculating the maxi-mal parametric perturbation disk (in two parameter cases), and also corroborate, in principle, the similarity between pole location and H2 performance robustness. |