On H-Spaces and a Congruence of Catalan Numbers
Abstract
For p an odd prime and F the cyclic group of order p, we show that the number of conjugacy classes of embeddings of F in SU(p) such that no element of F has 1 as an eigenvalue is (1+Cp-1)/p, where Cp-1 is a Catalan number. We prove that the only coset space SU(p)/F that admits a p-local H-structure is the classical Lie group PSU(p). We also show that SU(4)/ Z3, where Z3 is embedded off the center of SU(4), is a novel example of an H-space, even globally. We apply our results to the study of homotopy classes of maps from BF to BSU(n).
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