suppose group G acts on group W,i.e.there is an injective hom from G to Aut(W).
different injections give different actions.if the orbit spaces of two G actions on W are the same,on what ocassions, do we have the two actions are equivalent(i,e,the images of two injections from G to Aut(W) are conjugate in Aut(W))
Any comments on this question are welcome.