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The motivic Steenrod algebra in positive characteristic

Let S be an essentially smooth scheme over a field and l a prime number invertible on S. We show that the algebra of bistable operations in the mod l motivic cohomology of smooth S-schemes is generated by the motivic Steenrod operations. This was previously proved by Voevodsky for S a field of characteristic zero. We follow Voevodsky's proof but remove its dependence on characteristic zero by using étale cohomology instead of topological realization and by replacing resolution of singularities with a theorem of Gabber on alterations.

preprint2013arXivOpen access
Marc HoyoisShane KellyPaul Arne Østvær
math.ATmath.AGmath.KT
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Marc HoyoisShane KellyPaul Arne Østvær

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