Generically log smooth families via generators and relations

Abstract

Let f X A1t be an affine flat morphism of finite type, and let V = f-1(0). Then, we obtain a morphism of log schemes f (X|V) (A1t|0). In this article, we develop algorithmic tools to study the log-geometric properties of f by means of a presentation \[(X,OX) = [t,x1,…,xn]/(f1,…,fr).\] We obtain similar tools for projective flat morphisms when the homogeneous coordinate ring is given by generators and relations. We provide an implementation of our algorithms in Macaulay2. In a slightly different direction, we give some results on the sheaf LSV of log smooth structures on a toroidal crossing scheme (V,P,).