Geometric presentations of Milnor K-groups of certain Artin algebras and Bass-Tate-Kato norms

Abstract

For an arbitrary field k, and an arbitrary regular henselian local k-scheme X of dimension 1 with the residue field k, we introduce two subcomplexes of the higher Chow complexes of X using certain extended face intersection conditions. We define suitable equivalence relations on them, and prove that their Milnor range cycle class groups offer geometric presentations of the improved (Gabber-Kerz) Milnor K-groups of Artin local k-algebras of the embedding dimension 1, and their relative groups, generalizing the theorem of Nesterenko-Suslin and Totaro. Using these, we prove the existence of the norm and trace maps for the Milnor K-groups of the Artin local algebras associated to arbitrary finite extensions of fields, generalizing the Bass-Tate and Kato norms on the Milnor K-theory of fields.

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