M*, N*, and H*

Abstract

Let M = N × [0,1]. The natural projection π: M → N, which sends (n,x) to n, induces a projection mapping π*: M* → N*, where M* and N* denote the Cech-Stone remainders of M and N, respectively. We show that CH implies every autohomeomorphism of N* lifts through the natural projection to an autohomeomorphism of M*. That is, for every homeomorphism h: N* → N* there is a homeomorphism H: M* → M* such that π* H = h π*. This complements a recent result of the second author, who showed that this lifting property is not a consequence of ZFC. Combining this lifting theorem with a recent result of the first author, we also prove that CH implies there is an order-reversing autohomeomorphism of~ H*, the Cech-Stone remainder of the half line H = [0,∞).