Expansive Actions of Automorphisms of Locally Compact Groups G on SubG

Abstract

For a locally compact metrizable group G, we consider the action of Aut(G) on SubG, the space of all closed subgroups of G endowed with the Chabauty topology. We study the structure of groups G admitting automorphisms T which act expansively on SubG. We show that such a group G is necessarily totally disconnected, T is expansive and that the contraction groups of T and T-1 are closed and their product is open in G; moreover, if G is compact, then G is finite. We also obtain the structure of the contraction group of such T. For the class of groups G which are finite direct products of Qp for distinct primes p, we show that T∈ Aut(G) acts expansively on SubG if and only if T is expansive. However, any higher dimensional p-adic vector space Qpn, (n≥ 2), does not admit any automorphism which acts expansively on SubG.