Routh–Hurwitz theorem

In mathematics, the Routh–Hurwitz theorem gives a test to determine whether all roots of a given polynomial lie in the left half-plane. Polynomials with this property are called Hurwitz stable polynomials. The Routh–Hurwitz theorem is important in dynamical systems and control theory, because the characteristic polynomial of the differential equations of a stable linear system has roots limited to the left half plane (negative eigenvalues). Thus the theorem provides a mathematical test, the Routh–Hurwitz stability criterion, to determine whether a linear dynamical system is stable without solving the system. The Routh–Hurwitz theorem was proved in 1895, and it was named after Edward John Routh and Adolf Hurwitz.

Notations

Let $f (z)$ be a polynomial (with complex coefficients) of degree $n$ with no roots on the imaginary axis (i.e. the line $z = ic$ where $i$ is the imaginary unit and $c$ is a real number). Let us define real polynomials $P 0 (y)$ and $P 1 (y)$ by $f (iy) = P 0 (y) + iP 1 (y)$ , respectively the real and imaginary parts of $f$ on the imaginary line.

Furthermore, let us denote by:

$p$ the number of roots of $f$ in the left half-plane (taking into account multiplicities);
$q$ the number of roots of $f$ in the right half-plane (taking into account multiplicities);
$Δ arg f (iy)$ the variation of the argument of $f (iy)$ when $y$ runs from $-\infty$ to $+\infty$ ;
$w (x)$ is the number of variations of the generalized Sturm chain obtained from $P 0 (y)$ and $P 1 (y)$ by applying the Euclidean algorithm;
$I +\infty -\infty r$ is the Cauchy index of the rational function $r$ over the real line.

Statement

With the notations introduced above, the Routh–Hurwitz theorem states that:

p-q={\frac {1}{\pi }}\Delta \arg f(iy)=\left.{\begin{cases}+I_{-\infty }^{+\infty }{\frac {P_{0}(y)}{P_{1}(y)}}&{\text{for odd degree}}\\[10pt]-I_{-\infty }^{+\infty }{\frac {P_{1}(y)}{P_{0}(y)}}&{\text{for even degree}}\end{cases}}\right\}=w(+\infty )-w(-\infty ).

From the first equality we can for instance conclude that when the variation of the argument of $f (iy)$ is positive, then $f (z)$ will have more roots to the left of the imaginary axis than to its right. The equality $p - q = w (+\infty) - w (-\infty)$ can be viewed as the complex counterpart of Sturm's theorem. Note the differences: in Sturm's theorem, the left member is $p + q$ and the $w$ from the right member is the number of variations of a Sturm chain (while $w$ refers to a generalized Sturm chain in the present theorem).

Routh–Hurwitz stability criterion

We can easily determine a stability criterion using this theorem as it is trivial that $f (z)$ is Hurwitz-stable if and only if $p - q = n$ . We thus obtain conditions on the coefficients of $f (z)$ by imposing $w (+\infty) = n$ and $w (-\infty) = 0$ .

References

Routh, E. J. (1877). A Treatise on the Stability of a Given State of Motion, Particularly Steady Motion. Macmillan and co.
Hurwitz, A. (1964). "On The Conditions Under Which An Equation Has Only Roots With Negative Real Parts". In Bellman, Richard; Kalaba, Robert E. (eds.). Selected Papers on Mathematical Trends in Control Theory. New York: Dover.
Gantmacher, F. R. (2005) [1959]. Applications of the Theory of Matrices. New York: Dover. pp. 226–233. ISBN 0-486-44554-2.
Rahman, Q. I.; Schmeisser, G. (2002). Analytic theory of polynomials. London Mathematical Society Monographs. New Series. Vol. 26. Oxford: Oxford University Press. ISBN 0-19-853493-0. Zbl 1072.30006.
Explaining the Routh–Hurwitz Criterion (2020)^[1]

External links

Mathworld entry