Topological actions of wreath products

Abstract

Let G and H be two groups acting on path connected topological spaces X and Y respectively. Assume that H is finite of order m and the quotient maps p:X X/G and q:Y Y/H are regular coverings. Then it is well-known that the wreath product G H naturally acts on W = Xm× Y, so that the quotient map r:W W/(G H) is also a regular covering. We give an explicit description of π1(W/(G H)) as a certain wreath product π1(X/G)\,∂Yπ1(Y/H) corresponding to a non-effective action of π1(Y/H) on the set of maps Hπ1(X/G) via the boundary homomorphism ∂Y:π1(Y/H) H of the covering map q. Such a statement is known and usually exploited only when X and Y are contractible, in which case W is also contractible, and thus W/(G H) is the classifying space of G H. The applications are given to the computation of the homotopy types of orbits of typical smooth functions f on orientable compact surfaces M with respect to the natural right action of the groups D(M) of diffeomorphisms of M on C∞(M,R).