论文信息 - An interference effect of independent delays

An interference effect of independent delays

For a second-order linear retarded delay-differential equation with two independent delays, two methods are used to demonstrate an interference effect that can reduce the likelihood of instability. Both methods rely on the basic result that stability changes only take place at pure imaginary values of the complex eigenvalue. One method uses the eliminant, which is zero if and only if both real and imaginary parts of the characteristic equation are satisfied. The other is an extension of a method used in problems with one delay, in which a certain curve is plotted to find whether it intersects the unit circle. When this interference effect is present, equal delays are particularly unlikely to destabilise.

N. Macdonald | N. MacDonald

[1] E. P. Popov,et al. The Dynamics of Automatic Control Systems. , 1964 .

[2] J. Hale,et al. Stability in Linear Delay Equations. , 1985 .

[3] E. P. Popov. FORMS OF AUTOMATIC CONTROL SYSTEMS , 1961 .

[4] E. Jury,et al. Stability independent and dependent of delay for delay differential systems , 1984 .

[5] E. W. Kamen,et al. Linear systems with commensurate time delays: stability and stabilization independent of delay , 1982 .

[6] J. J. Sylvester,et al. XXIII. A method of determining by mere inspection the derivatives from two equations of any degree , 1840 .

[7] J. Chiasson,et al. A simplified derivation of the Zeheb-Walach 2-D stability test with applications to time-delay systems , 1985, The 23rd IEEE Conference on Decision and Control.

[8] E. I. Jury,et al. Stability conditions for a class of delay differential systems , 1982 .

[9] Ezra Zeheb,et al. Simplified analytic stability test for systems with commensurate time delays , 1984 .

[10] E. Kamen. On the relationship between zero criteria for two-variable polynomials and asymptotic stability of delay differential equations , 1980 .

[11] K. Cooke,et al. Discrete delay, distributed delay and stability switches , 1982 .

[12] K. Cooke,et al. On zeroes of some transcendental equations , 1986 .