Dynamics of Certain Distal Actions on Spheres

Abstract

Consider the action of SL(n+1,R) on Sn arising as the quotient of the linear action on Rn+1\0\. We show that for a semigroup S of SL(n+1,R), the following are equivalent: (1) S acts distally on the unit sphere Sn. (2) the closure of S is a compact group. We also show that if S is closed, the above conditions are equivalent to the condition that every cyclic subsemigroup of S acts distally on Sn. On the unit circle S1, we consider the `affine' actions corresponding to maps in GL(2,R) and discuss the conditions for the existence of fixed points and periodic points, which in turn imply that these maps are not distal.