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arxiv: 1608.06612 · v1 · pith:3UFTW7K6new · submitted 2016-08-23 · 🧮 math.MG · math.AT· math.CO

Restricting cohomology classes to disk and segment configuration spaces

classification 🧮 math.MG math.ATmath.CO
keywords cohomologyconfconfigurationspacediskgivenlabeledsegment
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The configuration space of n labeled disks of radius r inside the unit disk is denoted Conf_{n, r}(D^2). We study how the cohomology of this space depends on r. In particular, given a cohomology class of Conf_{n, 0}(D^2), for which r does its restriction to Conf_{n, r}(D^2) vanish? A related question: given the configuration space Seg_{n, r}(D^2) of n labeled, oriented segments of length r, it has a map to (S^1)^n that records the direction of each segment. For which r does this angle map have a continuous section? The paper consists of a collection of partial results, and it contains many questions and conjectures.

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