摘要
Let 6/P be a homogenous space with G a compact connected Lie group and P a connected subgroup of G of equal rank. As the rational cohomology ring of G/P is concentrated in even dimen- sions, for an integer k we can define the Adams map of type k to be lk : H^*(G/P,Q)→ H^*(G/P,Q), lk(u) = k^iu, u ∈ H^2i(G/P,Q). We show that if k is prime to the order of the Weyl group of G2 then lk can be induced by a self map of G/P. We also obtain results which imply the condition that k is prime to the order of the Weyl group of G is necessary.
Let 6/P be a homogenous space with G a compact connected Lie group and P a connected subgroup of G of equal rank. As the rational cohomology ring of G/P is concentrated in even dimen- sions, for an integer k we can define the Adams map of type k to be lk : H^*(G/P,Q)→ H^*(G/P,Q), lk(u) = k^iu, u ∈ H^2i(G/P,Q). We show that if k is prime to the order of the Weyl group of G2 then lk can be induced by a self map of G/P. We also obtain results which imply the condition that k is prime to the order of the Weyl group of G is necessary.
