Daniel Berg: Toric stacks

Toric varieties are simple enough to describe explicitly, yet complicated enough to provide a rich source of interesting examples of algebro-geometric concepts. Toric methods can also be used to study algebraic stacks. Just as toric varieties, toric stacks have explicit descriptions in terms of combinatorics and homogeneous coordinates. This alows us to compute and describe things such as Picard groups, sheaves of differentials, cotangent complexes, blow ups as well  as purely stacky constructions, such as root stacks, explicitly.

I will explain some of the concepts above. Depending on your preferences, you may see this talk as an attempt at introducing toric geometry via algebraic stacks or introducing algebraic stacks via toric geometry. Or you may simply see it as an attempt at introducing both, using elementary algebraic geometry.