Dynamics of actions of automorphisms on the space of one-parameter subgroups of a torus and applications

Abstract

For a connected Lie group G, we study the dynamics of actions of automorphisms of G on certain compact invariant subspaces of closed subgroups of G in terms of distality and expansivity. We show that only the finite order automorphisms of G act distally on SubpG, the smallest compact space containing all closed one-parameter subgroups of G, when G is any n-torus, n∈N. This enables us to relate distality of the T-action on SubpG with that of the T-action on G and characterise the same in terms of compactness of closed subgroups generate by T in the group Aut(G), in case G is not a vector group. We also extend these results to the action of subgroups of automorphisms. We show that any n-torus G, n≥ 2, more generally, any connected Lie group G whose central torus has dimension at least 2, does not admit any automorphism which acts expansively on SubpG. Our results generalise some results on distal actions by Shah and Yadav, and by Chatterjee and Shah, and some results on expansive actions by Prajapati and Shah.

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