Complex Vasquez invariant

Abstract

In 1970 Vasquez proved that to every finite group G we can assign a natural number n(G) with the property that every flat manifold with holonomy G is a total space of a fiber bundle, with the fiber being a flat torus and the base space -- a flat manifold of dimension less than or equal to n(G). In particular, this means that the characteristic algebra of any flat manifold with holonomy G vanishes in dimension greater than n(G). We define a complex analog of Vasquez invariant, in which finite groups are considered as holonomy groups of compact flat K\"ahler manifolds.