Some new results for system decoupling and pole assignment problems |
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Authors: | Musheng Wei [Author Vitae] Qian Wang [Author Vitae] |
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Affiliation: | a College of Mathematics and Science, Shanghai Normal University, Scientific Computing Key Laboratory of Shanghai Universities, Shanghai 200234, China b Department of Mathematics, East China Normal University, Shanghai 200241, China c Department of Mathematics and Information, Ludong University, Yantai, Shandong 264025, China |
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Abstract: | In a related article, we derived a canonical decomposition of the right invertible system {C,A,B} and applied this canonical decomposition to study the Smith form of the matrix pencil and findout the finite zeros and infinite zeros of P(s), the range of the ranks of P(s) for s∈C, and the controllability of the right invertible system.In this paper, we will apply this canonical decomposition of the right invertible system {C,A,B} to deduce the triangular decouple upon to row permutation, provide some new results of the row-by-row decoupling, and associated pole assignment problems. |
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Keywords: | Right invertible system Canonical decomposition Triangular decoupling Row-by-row decoupling Pole assignment |
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