Let $\mathfrak{g}$ be a semisimple Lie Algebra, $\langle \cdot,\cdot\rangle$ the Killing form, and $\mathfrak{h}\subset \mathfrak{g}$ a subalgebra of $\mathfrak{g}$.
I'm trying to find a counterexample (or prove) the following affirmation:
Affirmation: $\mathfrak{h} \cap \mathfrak{h}^\perp = \{0\}$,
where $\mathfrak{h}^\perp = \{X \in \mathfrak{g};\ \langle X, Y\rangle =0, \ \forall \ Y\in \mathfrak{h} \}$.
Does anyone know how to prove this or have a nice counterexample?
NB: In my opinion this affirmation seems false, however all spaces that I tried $\mathfrak{h} \cap \mathfrak{h}^\perp = \{0\}$ held.
Best Answer
Take any semi-simple algebra $g$ which is not compact, the killing form is not a scalar product, there exists $x\in g$ such that $\langle x,x\rangle =0$, $Vect(x)$ is a subalgebra of $g$ and $x$ is in the orthogonal of $Vect(x)$.