Lannes's T-functor and equivariant Chow rings
Abstract
For X a smooth scheme acted on by a linear algebraic group G and p a prime, the equivariant Chow ring CH*G(X) Fp is an unstable algebra over the Steenrod algebra. We compute Lannes's T-functor applied to CH*G(X) Fp. As an application, we compute the localization of CH*G(X) Fp away from n-nilpotent modules over the Steenrod algebra, affirming a conjecture of Totaro as a special case. The case when X is a point and n = 1 generalizes and recovers an algebro-geometric version of Quillen's stratification theorem proved by Yagita and Totaro.
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