Co-elementary equivalence, co-elementary maps, and generalized arcs
逻辑
2009-09-25 v1
摘要
By a {\bf generalized arc\/} we mean a continuum with exactly two non-separating points; an {\bf arc} is a metrizable generalized arc. It is well known that any two arcs are homeomorphic (to the real closed unit interval); we show that any two generalized arcs are co-elementarily equivalent, and that co-elementary images of generalized arcs are generalized arcs. We also show that if is a function between compact Hausdorff spaces and if is an arc, then is a co-elementary map if and only if is an arc and is a monotone continuous surjection.
引用
@article{arxiv.math/9408203,
title = {Co-elementary equivalence, co-elementary maps, and generalized arcs},
author = {Paul Bankston},
journal= {arXiv preprint arXiv:math/9408203},
year = {2009}
}