Subject: question From: adel george Date: Thu, 28 Apr 2005 12:29:44 -0700 (PDT) From:Dr.George,Adel A. I wish to post the following question to the list: Let G be a locally compact topological group and let {K(i)}be a family of left cosets of subgroups of G .Let this family have the finite intersection property.Does this family has a non-void intersection ? From:Dr.George,Adel A. I have the following question,please post it: Let X(i) be an inverse system of contractible topological groups where for j>i the map X(j)--->X(i)is a continuous surjection with contractible fibers(but not neccessarily a group homomorphism).I wish to show that X(= the inverse limit of the X(i)) is nonempty?