Categorical formal punctured neighborhood of infinity, I

Abstract

In this paper we introduce and study the formal punctured neighborhood of infinity, both in the algebro-geometric and in the DG categorical frameworks. For a smooth algebraic variety X over a field of characteristic zero, one can take its smooth compactification X⊃ X, and then take the DG category of perfect complexes on the formal punctured neighborhood of the infinity locus X-X. The result turns out to be independent of X (up to a quasi-equivalence) and we denote this DG category by Perf(X∞). We show that this construction can be done purely DG categorically (hence of course also A∞-categorically). For any smooth DG category B, we construct the DG category Perftop(B∞), which we call the category of perfect complexes on the formal punctured neighborhood of infinity of B. The construction is closely related to the algebraic version of a Calkin algebra: endomorphisms of an infinite-dimensional vector space modulo endomorphisms of finite rank. We prove that the DG categorical construction is compatible with the algebro-geometric one. We study numerous examples. In particular, for the algebra of rational functions on a smooth complete connected curve C we obtain the algebra of adeles AC, and for B=Dbcoh(Y) for a proper singular scheme Y we obtain the category Dsg(Y)op -- the opposite category of the Orlov's category of singularities. Among other things, we discuss the relation with the papers of Tate Ta and Arbarello, de Concini, and Kac ACK.