Equivariant Chow ring and Chern classes of wonderful symmetric varieties of minimal rank
Abstract
We describe the equivariant Chow ring of the wonderful compactification X of a symmetric space of minimal rank, via restriction to the associated toric variety Y. Also, we show that the restrictions to Y of the tangent bundle TX and its logarithmic analogue SX decompose into a direct sum of line bundles. This yields closed formulae for the equivariant Chern classes of TX and SX, and, in turn, for the Chern classes of reductive groups considered by Kiritchenko.
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