Baum-Bott residue currents

Abstract

Let F be a holomorphic foliation of rank on a complex manifold M of dimension n, let Z be a compact connected component of the singular set of F, and let ∈ C[z1,…,zn] be a homogeneous symmetric polynomial of degree with n- < ≤ n. Given a locally free resolution of the normal sheaf of F, equipped with Hermitian metrics and certain smooth connections, we construct an explicit current RZ with support on Z that represents the Baum-Bott residue res(F; Z)∈ H2n-2(Z, C) and is obtained as the limit of certain smooth representatives of res(F; Z). If the connections are (1,0)-connections and codim Z≥ , then RZ is independent of the choice of metrics and connections. When F has rank one we give a more precise description of RZ in terms of so-called residue currents of Bochner-Martinelli type. In particular, when the singularities are isolated, we recover the classical expression of Baum-Bott residues in terms of Grothendieck residues.