Extension properties of Stone-Cech coronas and proper absolute extensors

Abstract

We characterize, in terms of X, extensional dimension of the Stone-Cech corona β X X of locally compact and Lindel\"of space X. The non-Lindel\"of case case is also settled in terms of extending proper maps with values in Iτ L, where L is a finite complex. Further, for a finite complex L, an uncountable cardinal τ and a Zτ-set X in the Tychonov cube Iτ we find necessary and sufficient condition, in terms of Iτ X, for X to be in the class AE([L]). We also introduce a concept of a proper absolute extensor and characterize the product [0,1)× Iτ as the only locally compact and Lindel\"of proper absolute extensor of weight τ > ω which has the same pseudocharacter at each point.