Complex moduli space (or Teichmuller space) of a Quintic CalabiYau 3fold is a 101dimensional complex orbifold. Does it have a toric structure?
The complex moduli space does not admit a toric strucutre, since the orbifold fundamental group of a toric orbifold must be abelian. Indeed, $\pi_1(\mathbb C^*)^n$ surjects on the orbifold fundamental group. Also, the orbifold stabisier of each point on a toric orbifold is a finite abelian group. At the same time the stabiliser of the quintic $\sum_i z^5=0$ is a noncomutative group. Also I am sure that the orbifold fundamental group of the moduli space of quintics contains free (nonabelian) subgroups, but I don't know how to prove it. Also it should be true that the Tiechmuller space is not algebraic. It least this happen in lower dimensions for cubics in $\mathbb CP^2$ and for quartics in $\mathbb CP^3$.
In the first case the Theichmuiller space is a disk, and in the second it is 

