Identifiabilty of systems described by convolution equations
暂无分享,去创建一个
[1] A. Stephen Morse. Ring models for delay-differential systems , 1976, Autom..
[2] Eric Walter,et al. Identifiability and distinguishability concepts in electrochemistry , 1996, Autom..
[3] A. Michel,et al. An invariance theorem with applications to adaptive control , 1990 .
[4] Edward W. Kamen,et al. On an algebraic theory of systems defined by convolution operators , 1975, Mathematical systems theory.
[5] V. Lunel,et al. Identification problems in functional differential equations , 1997, Proceedings of the 36th IEEE Conference on Decision and Control.
[6] L. Ehrenpreis,et al. Solution of Some Problems of Division. Part IV. Invertible and Elliptic Operators , 1960 .
[7] Christiaan Heij,et al. Introduction to mathematical systems theory , 1997 .
[8] Yutaka Yamamoto,et al. Reachability of a class of infinite-dimensional linear systems: an external approach with applicatio , 1989 .
[9] M. Fliess,et al. Flatness and defect of non-linear systems: introductory theory and examples , 1995 .
[10] S. Levy,et al. Elements of functional analysis , 1970 .
[11] L. Hörmander. The analysis of linear partial differential operators , 1990 .
[12] Jan C. Willems,et al. Introduction to mathematical systems theory: a behavioral approach, Texts in Applied Mathematics 26 , 1999 .
[13] Francis J. Doyle,et al. Identification and Control Using Volterra Models , 2001 .
[14] Yury Orlov,et al. Identifiability analysis of linear delay‐differential systems , 2002 .
[15] Y. Yamamoto. A note on linear input/output maps of bounded-type , 1984 .
[16] Yury Orlov,et al. Identifiability of linear time delay systems , 2000 .
[17] Sjoerd Verduyn Lunel. Parameter identifiability of differential delay equations , 2001 .
[18] A. Zemanian,et al. Distribution theory and transform analysis , 1966 .
[19] Sandro Zampieri,et al. Controllability of Systems Described by Convolutional or Delay-Differential Equations , 2000, SIAM J. Control. Optim..
[20] Luc C. G. J. M. Habets,et al. System Equivalence for AR-Systems over Rings—with an Application to Delay-Differential Systems , 1997, 1997 European Control Conference (ECC).