Integral homology of loop groups via Langlands dual groups

Yun, Zhiwei; Zhu, Xinwen

doi:10.1090/S1088-4165-2011-00399-X

Integral homology of loop groups via Langlands dual groups
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by Zhiwei Yun and Xinwen Zhu

Represent. Theory 15 (2011), 347-369

DOI: https://doi.org/10.1090/S1088-4165-2011-00399-X

Published electronically: April 20, 2011

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Abstract:

Let $K$ be a connected compact Lie group, and $G$ its complexification. The homology of the based loop group $\Omega K$ with integer coefficients is naturally a $\mathbb {Z}$-Hopf algebra. After possibly inverting $2$ or $3$, we identify $H_*(\Omega K,\mathbb {Z})$ with the Hopf algebra of algebraic functions on $B^\vee _e$, where $B^\vee$ is a Borel subgroup of the Langlands dual group scheme $G^\vee$ of $G$ and $B^\vee _e$ is the centralizer in $B^\vee$ of a regular nilpotent element $e\in \operatorname {Lie} B^\vee$. We also give a similar interpretation for the equivariant homology of $\Omega K$ under the maximal torus action.

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