Rings of skew polynomials in algebraical approach to control theory
Kybernetika (1996)
- Volume: 32, Issue: 1, page 63-80
- ISSN: 0023-5954
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topJežek, Jan. "Rings of skew polynomials in algebraical approach to control theory." Kybernetika 32.1 (1996): 63-80. <http://eudml.org/doc/28391>.
@article{Ježek1996,
author = {Ježek, Jan},
journal = {Kybernetika},
keywords = {discrete-time systems; rings with derivation; control theory; time invariant systems; skew polynomials},
language = {eng},
number = {1},
pages = {63-80},
publisher = {Institute of Information Theory and Automation AS CR},
title = {Rings of skew polynomials in algebraical approach to control theory},
url = {http://eudml.org/doc/28391},
volume = {32},
year = {1996},
}
TY - JOUR
AU - Ježek, Jan
TI - Rings of skew polynomials in algebraical approach to control theory
JO - Kybernetika
PY - 1996
PB - Institute of Information Theory and Automation AS CR
VL - 32
IS - 1
SP - 63
EP - 80
LA - eng
KW - discrete-time systems; rings with derivation; control theory; time invariant systems; skew polynomials
UR - http://eudml.org/doc/28391
ER -
References
top- W. Greub, Linear Algebra, Springer Verlag, New York 1975. (1975) Zbl0317.15002MR0369382
- N. Jacobson, Structure of Rings, American Mathematical Society, Providence, R.I. 1956. (1956) Zbl0073.02002MR0081264
- V. Kučera, Discrete Linear Control - The Polynomial Approach, Wiley, Chichester 1979. (1979) MR0573447
- O. Øre, Theory of non-commutative polynomials, Ann. of Math. 34 (1933), 480-508. (1933) MR1503119
- H. W. Raudenbush, Jr., Differential fields and ideals of differential forms, Ann. of Math. 34 (1933), 509-517. (1933) Zbl0007.15103MR1503120
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