Unit roots/Appendix

Rule 1 of chapter 2[edit | edit source]

Given ${\displaystyle f(x)=p(x)\cdot q(x)}$. Let:

${\displaystyle f(x)=f_{0}x^{m}+f_{1}x^{m-1}+\cdots +f_{m-1}x+f_{m}}$,

${\displaystyle p(x)=p_{0}x^{n}+f_{1}x^{n-1}+\cdots +f_{m-1}x+f_{m}}$,

${\displaystyle q(x)=q_{0}x^{m-n}+f_{1}x^{m-n-1}+\cdots +f_{m-n-1}x+f_{m-n}}$,

(the leading coefficients ${\displaystyle f_{0}}$, ${\displaystyle p_{0}}$ and ${\displaystyle q_{0}}$ are nonzero). By comparing the coefficients of like terms of the expansions on both side of ${\displaystyle f(x)=p(x)\cdot q(x)}$, we get:

${\displaystyle f_{0}=p_{0}q_{0}}$,

${\displaystyle f_{1}=p_{0}q_{1}+p_{1}q_{0}}$,

${\displaystyle f_{2}=p_{0}q_{2}+p_{1}q_{1}+p_{2}q_{0}}$,

${\displaystyle \ldots }$.

${\displaystyle f_{m-n}=p_{0}q_{m-n}+p_{1}q_{m-n+1}+\cdots +p_{m-n}q_{0}}$,

So,

${\displaystyle q_{0}=f_{0}\div p_{0}}$,

${\displaystyle q_{1}=(f_{1}-p_{1}q_{0})\div p_{0}}$,

${\displaystyle q_{2}=(f_{2}-p_{1}q_{1}-p_{2}q_{0})\div p_{0}}$,

${\displaystyle \ldots }$.

${\displaystyle q_{m-n}=(f_{m-n}-p_{1}q_{m-n+1}-\cdots -p_{m-n}q_{0})\div p_{0}}$.

All coefficients of ${\displaystyle q(x)}$ can be computed by the four arithmetic operations, and all division operations are division by the same nonzero number ${\displaystyle p_{0}}$. Now, all operation results of complex numbers are complex numbers, and all operation results of real numbers are real numbers, and all operation results of rational numbers are rational numbers. Therefore, we can conclude that if ${\displaystyle f(x)}$ and ${\displaystyle p(x)}$ have complex, real or rational coefficients, then ${\displaystyle q(x)}$ must have complex, real or rational coefficients. On the other hand, if ${\displaystyle f(x)}$ and ${\displaystyle p(x)}$ have integer coefficients, and ${\displaystyle p_{0}=1}$, then ${\displaystyle q(x)}$ must also have integer coefficients.