Two isotropic subspaces in a symplectic vector space

Question

Let $k$ be a field of characteristic $0$, let $V$ be a finite-dimensional vector space over $V$, and let $\omega(-,-)$ be a symplectic bilinear form on $V$. In other words, $\omega(-,-)$ is an alternating form that is nondegenerate in the sense that it identifies $V$ with its dual $V^{\ast}$.

Now let $I,J \subset V$ be isotropic subspaces, that is, subspaces on which $\omega$ vanishes identically. The form $\omega(-,-)$ then induces symplectic forms on $I^{\perp}/I$ and $J^{\perp}/J$. Define a map $f\colon I^{\perp} \cap J^{\perp} \rightarrow I^{\perp}/I \oplus J^{\perp}/J$ via the formula $f(x) = (x,-x)$. The image of $f$ is then an isotropic subspace of $I^{\perp}/I \oplus J^{\perp}/J$.

A paper I am reading claims that the image of $f$ is a Lagrangian, that is, that $\text{Image}(f)^{\perp} = \text{Image}(f)$. I can't figure out how to prove this. Can anyone help?

Answer 1

$\DeclareMathOperator\im{im}$If you know a subspace of a finite-dimensional vector space is isotropic, to prove it is Lagrangian, it suffices to show it has half the total dimension. The rest is an easy linear algebra exercise: $$\dim \im(f)=\dim(I^\perp\cap J^\perp)-\dim \ker(f)=\dim((I\oplus J)^\perp)-\dim(I\cap J)=\dim V-\dim(I\oplus J)-\dim(I\cap J)=\dim V-\dim I-\dim J=(\dim I^\perp/I+\dim J^\perp/J)/2.$$

By the way, you need to use the symplectic form induced by $-\omega$ on the $J^\perp/J$ factor for $f$ to have isotropic image. Also, I think this question is more suitable for MathStackExchange.