Reverse mathematics of regular countable second countable spaces
Abstract
We study the reverse mathematics of characterization theorems of regular countable second countable spaces (or CSCS for short). We prove that arithmetic comprehension is equivalent over RCA0 to every T3 CSCS being metrizable, and we characterize the T3 spaces which are metrizable over RCA0. We show that Lynn's theorem for CSCS can be carried out in ACA0, namely that every zero dimensional separable space is homeomorphic to the order topology of a linear order. We also show that arithmetic comprehension is equivalent to every T2 compact CSCS being well-orderable. From general topology, we know that the locally compact T2 CSCS are the well-orderable CSCS, and that the T3 scattered CSCS are the completely metrizable CSCS. We show that these characterizations and a few others are equivalent to arithmetic transfinite recursion over RCA0. We also find a few statments that are equivalent to Π11 comprehension. In particular we show that every T3 CSCS has a Cantor Bendixson rank and that every T3 CSCS is the disjoint union of a scattered space and dense in itself space are equivalent to Π11 comprehension over RCA0.
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