Representation ring of Levi subgroups versus cohomology ring of flag varieties III

Abstract

For any reductive group G and a parabolic subgroup P with its Levi subgroup L, the first author [Ku2] introduced a ring homomorphism Pλ: RepCλ-poly(L) H*(G/P, C), where RepCλ-poly(L) is a certain subring of the complexified representation ring of L (depending upon the choice of an irreducible representation V(λ) of G with highest weight λ). In this paper we study this homomorphism for G=SO(2n) and its maximal parabolic subgroups Pn-k for any 2≤ k≤ n-1 (with the choice of V(λ) to be the defining representation V(ω1) in C2n). Thus, we obtain a C-algebra homomorphism n,kD: RepCω1-poly(SO(2k)) H*(OG(n-k, 2n), C). We determine this homomorphism explicitly in the paper. We further analyze the behavior of n,kD when n tends to ∞ keeping k fixed and show that n,k becomes injective in the limit. We also determine explicitly (via some computer calculation) the homomorphism Pλ for all the exceptional groups G (with a specific `minimal' choice of λ) and all their maximal parabolic subgroups except E8.

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