The \'etale sectional number is either 1 or infinity

Abstract

In this work, we show that the \'etale sectional number (\'Etale-sec(-)), i.e., the sectional number in the category of topological spaces with the \'etale quasi Grothendieck topology (as defined in arXiv:2410.22515), is either 1 or infinity. Specifically, given a continuous map f:X Y, we demonstrate that \[\'Etale-sec(f)=cases 1,& if f is locally sectionable, ∞,& if f is not locally sectionable. cases \] Additionally, for a path-connected space X, the \'etale topological complexity satisfies \[TC\'etale(X)=cases 1,& if X is locally contractible, ∞,& if X is not locally contractible. cases \] These results provide a way to understand the complexity of maps and spaces within the context of the \'etale quasi Grothendieck topology, a structure that considers local behavior of maps and spaces. The classification into values of 1 or infinity reflects a dichotomy in the local geometric structure of the map or space, with the presence or absence of local sections or contractibility significantly influencing the outcome.

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