Abstract
In this paper, we calculate the –torsion of the Farrell cohomology for low genus pure mapping class groups with punctures, where is an odd prime. Here, ‘low genus’ means ; and ‘pure mapping class groups with punctures’ means the mapping class groups with any number of punctures, where the punctures are not allowed to be permuted. These calculations use our previous results about the periodicity of pure mapping class groups with punctures, as well as other cohomological tools. The low genus cases are interesting because we know that the high genus cases can be reduced to the low genus ones. Also, the cohomological properties of the mapping class groups without punctures are closely related to our cases.
Citation
Qin Lu. "Farrell cohomology of low genus pure mapping class groups with punctures." Algebr. Geom. Topol. 2 (1) 537 - 562, 2002. https://doi.org/10.2140/agt.2002.2.537
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