Suppose $V$ is a $n$-dimensional vector space.
What is the kernel of
$$\bigwedge^p V \otimes \bigwedge^q V\longrightarrow \bigwedge^{p+q} V$$
here $p+q \le n$.
Suppose $V$ is a $n$-dimensional vector space.
What is the kernel of
$$\bigwedge^p V \otimes \bigwedge^q V\longrightarrow \bigwedge^{p+q} V$$
here $p+q \le n$.