Lusternik-Schnirelmann categories of non-simply connected compact simple Lie groups
Abstract
Let F X B be a fibre bundle with structure group G, where B is (d-1)-connected and of finite dimension, d ≥ 1. We prove that the strong L-S category of X is less than or equal to m + Bd, if F has a cone decomposition of length m under a compatibility condition with the action of G on F. This gives a consistent prospect to determine the L-S category of non-simply connected Lie groups. For example, we obtain PU(n) ≤ 3(n-1) for all n ≥ 1, which might be best possible, since we have PU(pr)=3(pr-1) for any prime p and r ≥ 1. Similarly, we obtain the L-S category of SO(n) for n ≤ 9 and PO(8). We remark that all the above Lie groups satisfy the Ganea conjecture on L-S category.
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