A series of series topologies on N
Abstract
Each series Σn=1∞ an of real positive terms gives rise to a topology on N = \1,2,3,...\ by declaring a proper subset A⊂eq N to be closed if Σn∈ A an < ∞. We explore the relationship between analytic properties of the series and topological properties on N. In particular, we show that, up to homeomorphism, |R|-many topologies are generated. We also find an uncountable family of examples \Nα\α ∈ [0,1] with the property that for any α < β, there is a continuous bijection Nβ→ Nα, but the only continuous functions Nα→ Nβ are constant.
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