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Statements

Subject Item
n2:RIV%2F00216305%3A26210%2F12%3APU97321%21RIV13-MSM-26210___
rdf:type
n4:Vysledek skos:Concept
dcterms:description
The most powerful methods of systems analysis have been developed for linear control systems. For a linear control system, all the relationships between the variables are linear differential equations, usually with constant coefficients. Actual control systems usually contain some nonlinear elements. In the following we show how the equations for nonlinear systems may be linearized. But the result is only applicable in a sufficiently small region in the neighbourhood of equilibrium point. The table in this paper includes the nonlinear equations and their the linear approximation. Then it is easy to find out if the nonlinear system is or is not stable; the task that usually ranks among the difficult tasks in engineering practice. The most powerful methods of systems analysis have been developed for linear control systems. For a linear control system, all the relationships between the variables are linear differential equations, usually with constant coefficients. Actual control systems usually contain some nonlinear elements. In the following we show how the equations for nonlinear systems may be linearized. But the result is only applicable in a sufficiently small region in the neighbourhood of equilibrium point. The table in this paper includes the nonlinear equations and their the linear approximation. Then it is easy to find out if the nonlinear system is or is not stable; the task that usually ranks among the difficult tasks in engineering practice.
dcterms:title
Contribution to Stability Control of Nonlinear Systems Contribution to Stability Control of Nonlinear Systems
skos:prefLabel
Contribution to Stability Control of Nonlinear Systems Contribution to Stability Control of Nonlinear Systems
skos:notation
RIV/00216305:26210/12:PU97321!RIV13-MSM-26210___
n4:predkladatel
n5:orjk%3A26210
n3:aktivita
n16:S
n3:aktivity
S
n3:cisloPeriodika
463-464
n3:dodaniDat
n14:2013
n3:domaciTvurceVysledku
n12:3153487 n12:8495726
n3:druhVysledku
n13:J
n3:duvernostUdaju
n17:S
n3:entitaPredkladatele
n18:predkladatel
n3:idSjednocenehoVysledku
128664
n3:idVysledku
RIV/00216305:26210/12:PU97321
n3:jazykVysledku
n10:eng
n3:klicovaSlova
linear system, non-linear system, linearization
n3:klicoveSlovo
n11:non-linear%20system n11:linear%20system n11:linearization
n3:kodStatuVydavatele
CH - Švýcarská konfederace
n3:kontrolniKodProRIV
[669C21F0EDC6]
n3:nazevZdroje
Advanced Materials Research
n3:obor
n15:BC
n3:pocetDomacichTvurcuVysledku
2
n3:pocetTvurcuVysledku
2
n3:rokUplatneniVysledku
n14:2012
n3:svazekPeriodika
2012
n3:tvurceVysledku
Matoušek, Radomil Švarc, Ivan
s:issn
1022-6680
s:numberOfPages
4
n9:organizacniJednotka
26210