Manifold pathologies and Baire-1 functions as cohomotopy groups
Abstract
A slight extension of a construction due to Calabi-Rosenlicht (and later Gabard, Baillif and others) produces a typically non-metrizable n-manifold P by gluing two copies of the open upper half-space H++ in Rn along the disjoint union of the spaces of rays within H++ originating at points ranging over a subset S⊂eq Rn-1 of the boundary Rn-1=∂H++. The fundamental group π1(P) is free on the complement S× of any singleton in S, and the main result below is that the first cohomotopy group π1(P), regarded as a space of functions S× Z, is precisely the additive group of integer-valued Baire-1 functions on S×. This occasions a detour on characterizations (perhaps of independent interest) of Baire-1 real-valued functions on a metric space (B,d) as various types of non-tangential boundary limits of continuous functions on B× R>0.
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