A nonstandard construction of direct limit group actions

Abstract

Manevitz and Weinberger (1996) proved that the existence of effective K-Lipschitz Z/nZ-actions implies the existence of effective K-Lipschitz Q/Z-actions for all compact connected manifolds with metrics, where K is a fixed Lipschitz constant. The Q/Z-actions were constructed from suitable actions of a sufficiently large hyperfinite cyclic group Z/γZ in the sense of nonstandard analysis. By modifying their construction, we prove that for every direct system (,Gλ,iλμ) of torsion groups with monomorphisms, the existence of effective K-Lipschitz Gλ-actions implies the existence of effective K-Lipschitz Gλ-actions. This generalises Manevitz and Weinberger's result.