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发表于 2025-3-21 18:43:57
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领先
发表于 2025-3-21 20:32:51
https://doi.org/10.1057/9780230374720l behavior that is discussed in this paper. The feedback structure of linear systems can be deduced through a vector bundle structure on ℙ. (ℂ) induced from the “natural bundle” structure on the Grassmannian manifold.
Mendacious
发表于 2025-3-22 00:43:29
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不合
发表于 2025-3-22 06:34:45
Conference proceedings 1980 algebro-geometric methods. The first was held in 1973 in London and the emphasis was largely on geometric methods. The second was held at Ames Research Center-NASA in 1976. There again the emphasis was on geometric methods, but algebraic geometry was becoming a dominant theme. In the two years afte
conservative
发表于 2025-3-22 11:20:28
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上下连贯
发表于 2025-3-22 14:19:58
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上下连贯
发表于 2025-3-22 17:53:42
Algebraic and Geometric Aspects of the Analysis of Feedback Systems,Thus (1.1)’ is an external description of σ, as one might see in Ohm’s law, where (1.1) is an internal description (i.e., involving states) of σ, as one might see in the non-autonomous differential equations for an RLC network being driven by an applied current u(t) and generating a voltage y(t).
类型
发表于 2025-3-22 22:45:01
(Fine) Moduli (Spaces) for Linear Systems: What are they and what are they Good for?, talks at this conference and similar problems as in these talks for networks will be discussed by Tyrone Duncan. The classifying fine moduli space cannot readily be extended and the concluding sections are devoted to this observation and a few more related results.
novelty
发表于 2025-3-23 04:58:04
Grassmannian Manifolds, Riccati Equations and Feedback Invariants of Linear Systems,l behavior that is discussed in this paper. The feedback structure of linear systems can be deduced through a vector bundle structure on ℙ. (ℂ) induced from the “natural bundle” structure on the Grassmannian manifold.
Adornment
发表于 2025-3-23 05:51:06
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