Hyperplanes in abelian groups and twisted signatures

Abstract

We investigate the following question: if A and A' are products of finite cyclic groups, when does there exist an isomorphism f: A A' which preserves the union of coordinate hyperplanes (equivalently, so that f(x) has some coordinate zero if and only if x has some coordinate zero)? We show that if such an isomorphism exists, then A and A' have the same cyclic factors; if all cyclic factors have order larger than 2, the map f is diagonal up to permutation, hence sends coordinate hyperplanes to coordinate hyperplanes. Thus one can recover the coordinate hyperplanes from knowledge of their union. This result is well-adapted for application to invariants with a certain multiplicativity property. As a model application, we show using twisted signatures that there exists a family of compact 4-manifolds X(n) with H1 X(n) = Z/n with the property that Π X(ni) Π X(n'j) if and only if the factors may be identified (up to permutation), and that the induced map on first homology is (up to permutation) represented by a diagonal matrix.