Reconstructing function fields from Milnor K-theory
Abstract
Let F be a finitely generated regular field extension of transcendence degree ≥ 2 over a perfect field k. We show that the multiplicative group F×/k× endowed with the equivalence relation induced by algebraic dependence on k determines the isomorphism class of F in a functorial way. As a special case of this result, we obtain that the isomorphism class of the graded Milnor K-ring KM*(F) determines the isomorphism class of F, when k is algebraically closed or finite.
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