Endomorphism/Generalized eigenspace/Algebraic multiplicity/Fact/Proof

We write the characteristic polynomial of ${\displaystyle {}\varphi }$ as

${\displaystyle {}\chi _{\varphi }=(X-\lambda )^{k}Q\,,}$

where ${\displaystyle {}(X-\lambda )}$ does not occur in ${\displaystyle {}Q}$ as a linear factor, that is, ${\displaystyle {}k}$ is the algebraic multiplicity of ${\displaystyle {}\lambda }$. Then, ${\displaystyle {}P=(X-\lambda )^{k}}$ and ${\displaystyle {}Q}$ are coprime, and, due to fact, we have the decompositon

${\displaystyle {}V=\operatorname {kern} P(\varphi )\oplus \operatorname {kern} Q(\varphi )\,,}$

and

${\displaystyle P(\varphi )={\left(\varphi -\lambda \operatorname {Id} \right)}^{k}\colon \operatorname {kern} Q(\varphi )\longrightarrow \operatorname {kern} Q(\varphi )}$

is a bijection. Moreover,

${\displaystyle {}H:=\operatorname {GeEig} _{\lambda }(\varphi )=\operatorname {kern} P(\varphi )\,,}$

where the inclusion ${\displaystyle {}\supseteq }$ is clear, and the other inclusion follows from the fact that higher powerse of ${\displaystyle {}X-\lambda }$ do not annihilate further elements, by the bijectivity on ${\displaystyle {}\operatorname {kern} Q(\varphi )}$ just mentioned. For the characteristic polynomial, we have, due to the direct sum decomposition according to fact, the relation

${\displaystyle {}\chi _{\varphi }=\chi _{1}\cdot \chi _{2}\,,}$

where ${\displaystyle {}\chi _{1}}$ is the characteristic polynomial of ${\displaystyle {}\varphi {|}_{H}}$ and ${\displaystyle {}\chi _{2}}$ is the characteristic polynomial of ${\displaystyle {}\varphi {|}_{\operatorname {kern} Q(\varphi )}}$. Since ${\displaystyle {}(\varphi -\lambda )^{k}}$ restricted to ${\displaystyle {}H}$ is the zero mapping, the minimal polynomial of ${\displaystyle {}\varphi {|}_{H}}$ and, hence, also the characteristic polynomial ${\displaystyle {}\chi _{1}}$ are some power of ${\displaystyle {}(X-\lambda )}$, say

${\displaystyle {}\chi _{1}=(X-\lambda )^{d}\,,}$

where

${\displaystyle {}d=\dim _{K}{\left(H\right)}\,.}$

In particular, ${\displaystyle {}d\leq k}$, as ${\displaystyle {}\chi _{1}}$ is a divisor of ${\displaystyle {}\chi _{\varphi }}$. Assume that ${\displaystyle {}d<k}$. Then ${\displaystyle {}\lambda }$ is a zero of ${\displaystyle {}\chi _{2}}$ and ${\displaystyle {}\lambda }$ is an eigenvalue of ${\displaystyle {}\varphi {|}_{\operatorname {kern} Q(\varphi )}}$. But this is a contradiction to the fact that ${\displaystyle {}P(\varphi )}$ is a bijection on this space.