Zero-stability, also known as D-stability in honor of Germund Dahlquist,[1] refers to the stability of a numerical scheme applied to the simple initial value problem .
A linear multistep method is zero-stable if all roots of the characteristic equation that arises on applying the method to have magnitude less than or equal to unity, and that all roots with unit magnitude are simple.[2] This is called the root condition[3] and means that the parasitic solutions of the recurrence relation will not grow exponentially.
Example
editThe following third-order method has the highest order possible for any explicit two-step method[2] for solving :
References
edit- ^ Dahlquist, Germund (1956). "Convergence and stability in the numerical integration of ordinary differential equations". Mathematica Scandinavica. 4 (4): 33–53. doi:10.7146/math.scand.a-10454. JSTOR 24490010. Retrieved 19 July 2022.
- ^ a b Hairer, Ernst; Nørsett, Syvert; Wanner, Gerhard (1987). Solving Ordinary Differential Equations I. Berlin: Springer-Verlag. pp. 326–328.
- ^ Butcher, John C (1987). The Numerical Analysis of Ordinary Differential Equations. Wiley. p. 11.