The problem is as follows.
Let $T:V \longrightarrow V$ be a normal ($T^*T=TT^*$) linear operator on a space $V$ over the field $\mathbb{C}$ such that $\dim(V)<\infty$. Let $W$ be a subspace of $V$.
Prove that if $W$ is $T$-invariant (that is, $T(W)\subset W $) then $W$ is $T^*$-invariant.
What I've already tried: I know that if $T:V \longrightarrow V$, then $\ker(T^*(V))=[T(V)]^\perp$. If this holds using the restriction $T|_W$ instead of $T$ and $W$ instead of $V$ then I can prove it, but in the end I couldn't prove that this property holds in that case, so I'm afraid that it isn't valid at all.
