Action of Non Abelian Group Generated by Affine Homotheties on Rn

Abstract

In this paper, we study the action of non abelian group G generated by affine homotheties on Rn. We prove that G satisfies one of the following properties: (i) there exist a subgroup FG of R\0 containing 0 in its closure, a G-invariant affine subspace EG of Rn and a in EG such that for every x in Rn the closure of the orbit G(x) is equal to FG .(x - a) +EG. In particular, G(x) is dense in EG for every x in EG and every orbit of U = RnG is minimal in U. (ii) there exists a closed subgroup HG of Rn and a in Rn such that for every x in Rn, the closure of the orbit G(x) is equal to the union of (x + HG) and (-x + a + HG).