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Article Dans Une Revue Journal of Pure and Applied Algebra Année : 2018

The Farrell--Tate and Bredon homology for PSL_4(Z) via cell subdivisions

Anh Tuan Bui
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Anh Tuan Bui
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Alexander D. Rahm

Résumé

We provide some new computations of Farrell–Tate and Bredon (co)homology for arithmetic groups. For calculations of Farrell-Tate or Bredon homology, one needs cell complexes where cell stabilizers fix their cells pointwise. We provide two algorithms computing an efficient subdivision of a complex to achieve this rigidity property. Applying these algorithms to available cell complexes for PSL_4(Z) provides computations of Farrell-Tate cohomology for small primes as well as the Bredon homology for the classifying spaces of proper actions with coefficients in the complex representation ring. On the other hand, in order to check correctness of the computer calculations, we describe the Farrell-Tate cohomology in some rank-one cases, using Brown's complex and a number-theoretic description of the conjugacy classification of cyclic subgroups.
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Dates et versions

hal-01398162 , version 1 (16-11-2016)
hal-01398162 , version 2 (24-08-2018)
hal-01398162 , version 3 (03-10-2018)
hal-01398162 , version 4 (10-10-2018)

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Anh Tuan Bui, Anh Tuan Bui, Alexander D. Rahm, Matthias Wendt. The Farrell--Tate and Bredon homology for PSL_4(Z) via cell subdivisions. Journal of Pure and Applied Algebra, In press. ⟨hal-01398162v3⟩
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