An algorithm for the classification of twisted forms of toric varieties

Abstract

Let K/k be a finite Galois extension, G=Gal(K/k), be a fan in a lattice N and X be an associated toric variety over k. It is well known that the set of K/k-forms of X is in bijection with H1(G,AutT), where AutT is an algebraic group of toric automorphisms of X. In this paper, we suggest an algorithm to compute H1(G,AutT) and find that followings can be classified via this algorithm : K/k-forms of all toric surfaces, K/k-forms of all 3-dimensional affine toric varieties with no torus factor, K/k-forms of all 3-dimensional quasi-projective toric varieties when K/k is cyclic.