The odd primary  -structure of low rank Lie groups and its application to exponents |
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| Authors: | Stephen D. Theriault |
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| Affiliation: | Department of Mathematical Sciences, University of Aberdeen, Aberdeen AB24 3UE, United Kingdom |
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| Abstract: | A compact, connected, simple Lie group  localized at an odd prime  is shown to be homotopy equivalent to a product of homotopy associative, homotopy commutative spaces, provided the rank of  is low. This holds for  , for example, if  . The homotopy equivalence is usually just as spaces, not multiplicative spaces. Nevertheless, the strong multiplicative features of the factors can be used to prove useful properties, which after looping can be transferred multiplicatively to  . This is applied to prove useful information about the torsion in the homotopy groups of  , including an upper bound on its exponent. |
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| Keywords: | Lie group exponent Whitehead product $H$-space |
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