Locally Trivial Deformations of Toric Varieties

Abstract

We study locally trivial deformations of toric varieties from a combinatorial point of view. For any fan Σ, we construct a deformation functor DefΣ by considering Čech zero-cochains on certain simplicial complexes. We show that under appropriate hypotheses, DefΣ is isomorphic to Def'XΣ, the functor of locally trivial deformations for the toric variety XΣ associated to Σ. In particular, for any complete toric variety X that is smooth in codimension 2 and Q-factorial in codimension 3, there exists a fan Σ such that DefΣ is isomorphic to DefX, the functor of deformations of X. We apply these results to give a new criterion for a smooth complete toric variety to have unobstructed deformations, and to compute formulas for higher order obstructions, generalizing a formula of Ilten and Turo for the cup product. We use the functor DefΣ to explicitly compute the deformation spaces for a number of toric varieties, and provide examples exhibiting previously unobserved phenomena. In particular, we classify exactly which toric threefolds arising as iterated P1-bundles have unobstructed deformation space.