Mod 2 cohomology of 2-configuration space of a closed surface and Stiefel--Whitney class
Abstract
In this paper, we compute the singular cohomology groups H*(C2(M);F2) of the ordered 2-configuration space C2(M) as 2-representations. Using the result, we determine the mod 2 cohomology of the unordered 2-configuration space B2(M) as a H*(RP∞;F2)-module. As a corollary of our computation, we see that the Stiefel--Whitney height of M is 2 or 3 when M is orientable or not, respectively.
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