Natural compactification of the moduli of toric pairs from the perspective of mirror symmetry

Abstract

We construct a compactification of the moduli of toric pairs by using ideas from mirror symmetry. The secondary fan (Q) is used in [Ale02] to parametrize degenerations of toric pairs. It is also used in [CLS11] to control the variation of GIT. We verify the prediction of mirror symmetry that (Q) for the moduli of toric pairs is equal to the Mori fan of the relative minimal models of the mirror family. As a result, we give an explicit construction of the compactification TQ of the moduli of toric pairs which is the normalization of the compactification in [Ale02] and [Ols08].