Conditions for a constrained system to have a set of impulse energy measures

R. M. Umesh

Kybernetika (1989)

  • Volume: 25, Issue: 1, page 45-59
  • ISSN: 0023-5954

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Umesh, R. M.. "Conditions for a constrained system to have a set of impulse energy measures." Kybernetika 25.1 (1989): 45-59. <http://eudml.org/doc/28595>.

@article{Umesh1989,
author = {Umesh, R. M.},
journal = {Kybernetika},
keywords = {n-th order single-input single-output linear time-invariant dynamical system; transfer function; impulse energy measures; time-invariant},
language = {eng},
number = {1},
pages = {45-59},
publisher = {Institute of Information Theory and Automation AS CR},
title = {Conditions for a constrained system to have a set of impulse energy measures},
url = {http://eudml.org/doc/28595},
volume = {25},
year = {1989},
}

TY - JOUR
AU - Umesh, R. M.
TI - Conditions for a constrained system to have a set of impulse energy measures
JO - Kybernetika
PY - 1989
PB - Institute of Information Theory and Automation AS CR
VL - 25
IS - 1
SP - 45
EP - 59
LA - eng
KW - n-th order single-input single-output linear time-invariant dynamical system; transfer function; impulse energy measures; time-invariant
UR - http://eudml.org/doc/28595
ER -

References

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  1. L. A. Zadeh, C. A. Desoer, Linear System Theory, McGraw-Hill, New York 1963. (1963) Zbl1145.93303
  2. V. F. Baklanov, Lowering the order of differential equations and transfer functions of control systems, Soviet Automatic Control 13 (1968), 1-7. (1968) 
  3. M. F. Hutton, Routh Approximation Method for High Order Linear Systems, Singer, Little Falls, N. J. 1973. (1973) 
  4. J. Lehoczky, The determination of simple quadratic integrals by Routh coefficients, Periodica Polytechnica Electrical Engineering 10 (1966), 2, 153-166. (1966) 
  5. C. Bruni A. Isidori, A. Ruberti, A method of realization based on the moments of the impulse response matrix, IEEE Trans. Automat. Control AC-14 (1969), 203-204. (1969) 
  6. R. M. Umesh, Approximate Model Matching, Unpublished Doctoral Thesis, Anna University, Madras, India 1984. (1984) 
  7. F. R. Gantmacher, Theory of Matrices, Volume 1, 2, Chelsea, New York 1959. (1959) MR1657129

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