Stone-Čech remainders of nowhere locally compact spaces

The Rudin-Keisler (and in the case the space S is countable, the Rudin-Frolík) order of the Stone-Čech remainder βS\S of the discrete space S has often been studied, yielding much useful information about βS. More recently, the Comfort order has been introduced. If (S, •) is a semigroup, then the op

The Stone-Ä Cech compactiÿcation of a locale L is shown to be obtained constructively by taking the Lindenbaum locale of the theory of almost prime completely regular ÿlters on L. Modifying the theory by replacing the completely below relation by the strongly below relation yields instead the compac

This papers contains two main results. The first is a theorem about continuous functions from a countably compact Hausdorff space into a compact F -space, which has applications to the algebraic properties of the Stone-Čech compactification βS of a discrete semigroup S. The second main result shows

We present two examples of nice normal spaces X having the property that for some fixedpoint free homeomorphism on X its tech-Stone extension has a fixed point. One of the spaces presented here is locally countable, locally compact, separable, normal, countably paracompact and weakly zero-dimensiona