Sectional category and The Fixed Point Property
Abstract
For a Hausdorff space X, we exhibit an unexpected connection between the sectional number of the Fadell-Neuwirth fibration π2,1X:F(X,2) X, and the fixed point property (FPP) for self-maps on X. Explicitly, we demonstrate that a space X has the FPP if and only if 2 is the minimal cardinality of open covers \Ui\ of X such that each Ui admits a continuous local section for π2,1X. This characterization connects a standard problem in fixed point theory to current research trends in topological robotics.
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