A hierarchy of maps between compacta
Abstract
Let be the class of compacta (i.e., compact Hausdorff spaces), with the subclass of Boolean spaces. For each ordinal and pair of subclasses of , we define , the class of maps of level at least from spaces in to spaces in , in such a way that, when , Lev}_{>=alpha}(BS,BS) consists of the Stone duals of Boolean lattice embeddings that preserve all prenex first-order formulas of quantifier rank . Maps of level are just the continuous surjections, and the maps of level are the co-existential maps. Co-elementary maps are of level for all ordinals ; of course in the Boolean context, the co-elementary maps coincide with the maps of level . The results of this paper include: (i) every map of level is co-elementary; (ii) the limit maps of an -indexed inverse system of maps of level are also of level ; and (iii) if is a co-elementary class, and , then Lev_{>=k}(K,K}) = Lev_{>=omega}(K,K). A space in is co-existentially closed in if . We showed in an earlier paper that every infinite member of a co-inductive co-elementary class (such as itself, , or the class of continua) is a continuous image of a space of the same weight that is co-existentially closed in that class. We show here that every compactum that is co-existentially closed in (a "co-existentially closed continuum") is both indecomposable and of covering dimension one.
Cite
@article{arxiv.math/9704205,
title = {A hierarchy of maps between compacta},
author = {Paul Bankston},
journal= {arXiv preprint arXiv:math/9704205},
year = {2016}
}