Cohomology of Aut(Fn) in the p-rank two case
Abstract
For odd primes p, we examine H*(Aut(F2(p-1)); (p)), the Farrell cohomology of the group of automorphisms of a free group F2(p-1) on 2(p-1) generators, with coefficients in the integers localized at the prime (p) ⊂ . This extends results by Glover and Mislin, whose calculations yield H*(Aut(Fn); (p)) for n ∈ \p-1,p\ and is concurrent with work by Chen where he calculates H*(Aut(Fn); (p)) for n ∈ \p+1,p+2\. The main tools used are Ken Brown's ``normalizer spectral sequence'', a modification of Krstic and Vogtmann's proof of the contractibility of fixed point sets for outer space, and a modification of the Degree Theorem of Hatcher and Vogtmann.
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