A multi-interval Chebyshev collocation approach for the stability of periodic delay systems with discontinuities

This paper investigates the stability of periodic delay systems with non-smooth coefficients using a multi-interval Chebyshev collocation approach (MIC). In this approach, each piecewise continuous interval is expanded in a Chebyshev basis of the first order. The boundaries of these intervals are placed at the points of discontinuity to recover the fast convergence properties of spectral methods. Stability is examined for a set of case studies that contain the complexities of periodic coefficients, delays and discontinuities. The new approach is also compared to the conventional Chebyshev collocation method.

► We describe multi-interval Chebyshev-collocation method for periodic delay systems. ► We study the stability of periodic delay systems with non-smooth coefficients. ► The model complexities include periodic coefficients, delays and discontinuities. ► The new approach is superior to the conventional Chebyshev-collocation method. ► It recovers the fast convergence properties of spectral methods.