Connected components of representation spaces of non-orientable surfaces
classification
🧮 math.GT
keywords
componentsclassconnectednon-orientablecasecertaincharacteristicclosed
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Let M be a compact closed non-orientable surface. We show that the space of representations of the fundamental group of M into PSL(2,R) has exactly two connected components. These two components are the preimages of a certain Stiefel-Whitney characteristic class, computed in a similar way as the Euler class in the orientable case.
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