A Generalized Contou-Carr\`ere Symbol and its Reciprocity Laws in Higher Dimensions

Abstract

We generalize the theory of Contou-Carr\`ere symbols to higher dimensions. To an (n+1)-tuple f0,…,fn ∈ A((t1))·s((tn))×, where A denotes a commutative algebra over a field k, we associate an element (f0,…,fn) ∈ A×, compatible with the higher tame symbol for k = A, and earlier constructions for n = 1, by Contou-Carr\`ere, and n = 2 by Osipov--Zhu. Our definition is based on the notion of higher commutators for central extensions of groups by spectra, thereby extending the approach of Arbarello--de Concini--Kac and Anderson--Pablos Romo. Following Beilinson--Bloch--Esnault for the case n=1, we allow A to be arbitrary, and do not restrict to artinian A. Previous work of the authors on Tate objects in exact categories, and the index map in algebraic K-theory is essential in anchoring our approach to its predecessors. We also revisit categorical formal completions, in the context of stable ∞-categories. Using these tools, we describe the higher Contou-Carr\`ere symbol as a composition of boundary maps in algebraic K-theory, and conclude the article by proving a version of Parshin--Kato reciprocity for higher Contou-Carr\`ere symbols.