Structure of connected nested automorphism groups

Abstract

In this article, we describe the maximal unipotent subgroups of Aut(X), where X is an affine algebraic variety. Every subgroup of this type has a structure analogous to that of the group of triangular automorphisms of An. In particular, it is nested, that is, a countable increasing union of algebraic subgroups. We show that a subgroup G⊂Aut(X) consisting of unipotent elements is closed if and only if it is nested. This implies that a connected nested subgroup of Aut(X) is closed, thus answering a question posed by Kraft and Zaidenberg (2022). We also extend the recent description of maximal commutative unipotent subgroups of Aut(X) due to Regeta and van Santen (2024), by providing a direct construction of such subgroups within our approach.

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