Monomial algebras and Gan-equivariant embeddings into toric varieties

Abstract

An induced additive action on a projective variety X⊂eqPn is a regular action of the group Gan on X with an open orbit that can be extended to a regular action on Pn. Such actions are known to correspond to pairs (A, U), where A is a local algebra and U is a generating subspace lying in the maximal ideal. This paper studies additive actions on projective toric varieties, with a particular focus on toric surfaces. We prove that for any linearly normal toric variety equipped with a torus-normalized additive action, the associated pair consists of a monomial algebra and a subspace spanned by variables. Also we describe pairs that correspond to additive actions on toric surfaces in low-dimensional projective spaces.

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