Nilpotent mapping/Kernel one-dimensional/Surjectivity/Exercise

Let ${\displaystyle {}K}$ be a field, and let ${\displaystyle {}V}$ denote a finite-dimensional ${\displaystyle {}K}$-vector space. Let

${\displaystyle \varphi \colon V\longrightarrow V}$

be a nilpotent linear mapping. Suppose that the kernel of ${\displaystyle {}\varphi }$ is one-dimensional. Let

${\displaystyle {}V_{i}=\operatorname {kern} \varphi ^{i}\,,}$

and let ${\displaystyle {}s}$ be the minimal number with

${\displaystyle {}\varphi ^{s}=0\,.}$

1. Show that all ${\displaystyle {}V_{i}}$, ${\displaystyle {}1\leq i\leq s}$, have a direct decomposition

   ${\displaystyle {}V_{i}=V_{i-1}\oplus U_{i}\,,}$

   where ${\displaystyle {}U_{i}}$ is one-dimensional.

2. Show that the restrictions

   ${\displaystyle \varphi \colon U_{i}\longrightarrow V_{i-1}}$

   are bijective for ${\displaystyle {}1<i<s}$.

3. Show that ${\displaystyle {}s}$ equals the dimension of ${\displaystyle {}V}$.