Schanuel's Conjecture

Conjecture
Let $z_1, \cdots, z_n$ be complex numbers that are linearly independent over the rational numbers $\Q$.

Then:
 * the extension field $\Q \left({z_1, \cdots, z_n, e^{z_1}, \cdots, e^{z_n}}\right)$ has transcendence degree at least $n$ over $\Q$

where $e^z$ is the complex exponential of $z$.