arXiv:1111.1868 Abstract | arXiv Analytics

arXiv:1111.1868 [math.RT]Abstract References Reviews Resources

The convolution algebra structure on $K^G(\mathcal{B} \times \mathcal{B})$

Published 2011-11-08Version 1

We show that the convolution algebra $K^G(\mathcal{B} \times \mathcal{B})$ is isomorphic to the Based ring of the lowest two-sided cell of the extended affine Weyl group associated to $G$, where $G$ is a connected reductive algebraic group over the field $\mathbb{C}$ of complex numbers and $\mathcal{B}$ is the flag variety of $G$.

Comments: 8 pages

Categories: math.RT, math.KT

Keywords: convolution algebra structure, extended affine weyl group, lowest two-sided cell, connected reductive algebraic group, complex numbers

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arXiv:1111.1868 [math.RT]Abstract References Reviews Resources

The convolution algebra structure on $K^G(\mathcal{B} \times \mathcal{B})$

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arXiv:1111.1868 [math.RT]AbstractReferencesReviewsResources

The convolution algebra structure on $K^G(\mathcal{B} \times \mathcal{B})$

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arXiv:1111.1868 [math.RT]Abstract References Reviews Resources