Equivariant K-theory of quaternionic flag manifolds
Abstract
We consider the manifold Fln(H)=Sp(n)/Sp(1)n of all complete flags in Hn, where H is the skew-field of quaternions. We study its equivariant K-theory rings with respect to the action of two groups: Sp(1)n and a certain canonical subgroup T:=(S1)n⊂ Sp(1)n (a maximal torus). For the first group action we obtain a Goresky-Kottwitz-MacPherson type description. For the second one, we describe the ring KT(Fln(H)) as a subring of KT(Sp(n)/T). This ring is well known, since Sp(n)/T is a complex flag variety.
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