Cohomology of Aut(F_n) in the p-rank two case

For odd primes p, we examine $\hat H^*(Aut(F_{2(p-1)}); \Z_{(p)})$, the Farrell cohomology of the group of automorphisms of a free group $F_{2(p-1)}$ on $2(p-1)$ generators, with coefficients in the integers localized at the prime $(p) \subset \Z$. This extends results by Glover and Mislin, whose calculations yield $\hat H^*(Aut(F_n); \Z_{(p)})$ for $n \in \{p-1,p\}$ and is concurrent with work by Chen where he calculates $\hat H^*(Aut(F_n); \Z_{(p)})$ for $n \in \{p+1,p+2\}$. 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.