The Chevalley--Weil formula for finite group actions on higher dimensional compact complex manifolds
Abstract
Building on the Atiyah--Singer holomorphic Lefschetz fixed-point theorem, we define ramification modules associated to the fixed loci of a finite group acting on a compact complex manifold. This allows us to generalize the Chevalley--Weil formula for compact Riemann surfaces to higher dimensions. More precisely, let G be a finite group acting on a compact complex manifold X, and let E be a G-equivariant locally free sheaf on X. Then, in the representation ring R(G)Q, we have \[ G(X, E):=Σi=0 X(-1)i[Hi(X, E)]=1|G|(X,E)[C[G]] + ΣZ(E)Z \] where Z runs over all connected components of the fixed-point sets Xg for g∈ G, and each (E)Z∈ R(X)Q, called the ramification module at Z, depends only on the restriction E|Z and the normal bundle NZ/X as GZ-equivariant bundles. We illustrate the computation of (E)Z in several special cases and provide a detailed example for faithful actions of G(Z/2Z)n on a compact complex surface.
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