Toric varieties and spherical embeddings over an arbitrary field

TLDR: In this paper, the authors characterize combinatorial objects corresponding to toric and spherical embeddings with group action, and construct an example of a smooth toric variety under a 3-dimensional nonsplit torus over $k$ whose fan is Galois-stable but which admits no $k-form.

Abstract: We are interested in two classes of varieties with group action, namely toric varieties and spherical embeddings. They are classified by combinatorial objects, called fans in the toric setting, and colored fans in the spherical setting. We characterize those combinatorial objects corresponding to varieties defined over an arbitrary field $k$. Then we provide some situations where toric varieties over $k$ are classified by Galois-stable fans, and spherical embeddings over $k$ by Galois-stable colored fans. Moreover, we construct an example of a smooth toric variety under a 3-dimensional nonsplit torus over $k$ whose fan is Galois-stable but which admits no $k$-form. In the spherical setting, we offer an example of a spherical homogeneous space $X_0$ over $\mr$ of rank 2 under the action of SU(2,1) and a smooth embedding of $X_0$ whose fan is Galois-stable but which admits no $\mr$-form.