Gauss Sums in Algebra and Topology

Abstract

We consider Gauss sums associated to functions T R/ Z which satisfy some sort of quadratic property and investigate their elementary properties. These properties and a Gauss sum formula from the nineteenth century due to Dirichlet give the Milgram Gauss sum formula computing the signature mod 8 of a non-singular bilinear form over Q. Brown derived some results on the signature mod 8 of non-singular integral forms. Kirby and Melvin gave a formula for a generalization of this invariant to possibly non-singular forms and we further generalize it here. The Milgram Gauss sum formula and these formulas allow us to reprove Brown's result without resort to Witt group calculations. Assuming a bit of algebraic topology, we reprove a theorem of Morita's computing the signature mod 8 of an oriented Poincar\'e duality space from the Pontrjagin square without using Bockstein spectral sequences. Since we work with forms which may be singular, we also obtain a version of Morita's theorem for Poincar\'e spaces with boundary. Finally we apply our results to the bilinear form Sq1x y on H1(M; Z/2 Z) of an orientable 3-manifold.