Operators on symmetric polynomials and applications in computing the cohomology of BPUn
Abstract
This paper studies the integral cohomology ring of the classifying space BPUn of the projective unitary group PUn. By calculating a Serre spectral sequence, we determine the ring stucture of H*(BPUn;Z) in dimensions ≤ 11. For any odd prime p, we also determine the p-primary subgroups of Hi(BPUn;Z) in the range i≤ 2p+13 for i odd and i≤ 4p+8 for i even. The main technique used in the calculation is applying the theory of Young diagrams and Schur polynomials to certain linear operators on symmetric polynomials.
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