Abstract
Let P U n PU_n denote the projective unitary group of rank n n and B P U n BPU_n be its classifying space. For an odd prime p p , we extend previous results to a complete description of H s ( B P U n ; Z ) ( p ) H^s(BPU_n;\mathbb {Z})_{(p)} for s > 2 p + 5 s>2p+5 by showing that the p p -primary subgroups of H s ( B P U n ; Z ) H^s(BPU_n;\mathbb {Z}) are trivial for s = 2 p + 3 s = 2p+3 and s = 2 p + 4 s = 2p+4 .
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