Zero stability

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 ${\displaystyle y^{\prime }(x)=0}$.

A linear multistep method is zero-stable if all roots of the characteristic equation that arises on applying the method to ${\displaystyle y^{\prime }(x)=0}$ 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.

The following third-order method has the highest order possible for any explicit two-step method^[2] for solving ${\displaystyle y^{\prime }(x)=f(x)}$: $${\displaystyle y_{n+2}+4y_{n+1}-5y_n=h(4f_{n+1}+2f_n).}$$ If ${\displaystyle f(x)=0}$ identically, this gives a linear recurrence relation with characteristic equation $${\displaystyle r^2+4r-5=(r-1)(r+5)=0.}$$ The roots of this equation are ${\displaystyle r=1}$ and ${\displaystyle r=-5}$ and so the general solution to the recurrence relation is ${\displaystyle y_n=c_1\cdot 1^n+c_2(-5{)}^n}$. Rounding errors in the computation of ${\displaystyle y_1}$ would mean a nonzero (though small) value of ${\displaystyle c_2}$ so that eventually the parasitic solution ${\displaystyle (-5{)}^n}$ would dominate. Therefore, this method is not zero-stable.

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