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PERFORMANCE, STABILV fY, DYNAMICS, AND CONTROL
5.7.1 Routh-sStabilitY Criterion Lhe closed-/oop
Routh's stabilitY criterion helps x;i~letermine whethe' ple?cfwhthout actua/lY
po/es arthpositive if ,eal or have positive rea/ parts if cornp
solving the closed-loop chalracteristic equation.
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464 PERFORMANCE, STABILITY, DYNAMiCS, AND CONTROL
The procedure is as follows.
1) Express the characteristic polynomial in the following form:
aos" + ats l-l + a2Sn-2 + - .. + an_is + an - 0 (5.115)
where the coefficients ao, ai,..., an are real quantities. We assume that an 7{: O
so that any zero root is removed.
2) Examine the value of each coefficient. If any coefficient is zero or negative
when at least one other coefficient is positive, then Routh's criterion states that
there will be at least one root of the characteristic polynomial that is imaginary
or has a positive.real part. In such a case, the system is not'stable. Therefore, for
stability,vaII the coefficients must be positive or must have the same sign. This
forms the necessary condition for stability.
3) To check whether the sufficiency condition is satisfied, form the Routh's array
as follows:
where
bi -
ai a2 - aOa3
ai
Sn 00 a2 a4 a6
b2 -
ai 04 - aoas
ai
ai a6 - aoai
ai
(5.116)
~ . . (5.117)
bla3 - alb2 bias -aIb3 bia7 - alb4
ci- b ' C2- b ' C3= b , ... (5.118)
and
di -
ci b2 - bi C2
CI
ci b3 - b} C3
CI
(5.119)
(5.120)
This process is continued until nth row has been completed. The complete array of
coefficients is triangular. Note that the evaluation of b,, c,, and d,, etc., is continued
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