Let $n\geq 1$ be an integer. There is an obvious family of $n$-dimensional unital algebras parametrized by $\mathbb{C}^{n(n-1)^2}$ such that any $n$-dimensional unital algebra is isomorphic to at least one algebra in the family.
A closed (possibly reducible) subvariety $V\subset \mathbb{C}^{n(n-1)^2}$ is representative if any $n$-dimensional commutative associative unital algebra is isomorphic to at least one algebra in the corresponding subfamily.
For $n\leq 6$ there is a zero-dimensional representative subvariety. What can we say about the minimum dimension of a representative subvariety for $n\geq 7$?