Similarity structures and de Rham decomposition

TL;DR

This paper investigates the structure of manifolds with similarity metrics, proving a de Rham decomposition with at most two factors, classifying certain cases, and extending the decomposition to manifolds with locally metric connections.

Contribution

It establishes a de Rham decomposition for similarity structures on compact manifolds, classifies two-factor cases in low dimensions, and introduces a new notion of transverse similarity structures.

Findings

Universal cover admits a de Rham decomposition with at most two factors.

Complete classification of two-factor examples when the non-flat factor has dimension 2.

M is a fibration by flat Riemannian manifolds, often flat tori, up to finite cover.

Abstract

A similarity structure on a connected manifold M is a Riemannian metric on its universal cover such that the fundamental group of M acts by similarities. If the manifold M is compact, we show that the universal cover admits a de Rham decomposition with at most two factors, one of which is Euclidean. Very recently, after Belgun and Moroianu conjectured that the number of factors was at most one, Matveev and Nikolayevsky found an example with two factors. When the non-flat factor has dimension 2, we give a complete classification of the examples with two factors. In greater dimensions, we make the first steps towards such a classification by showing that M is a fibration (with singularities) by flat Riemannian manifolds; up to a finite covering of M, we may assume that these manifolds are flat tori. We also prove a version of the de Rham decomposition theorem for the universal covers of manifolds with locally metric connections. During the proof, we define a notion of transverse (not necessarily flat) similarity structure on foliations, and show that foliations endowed with such a structure are either transversally flat or transversally Riemannian. None of these results assumes analyticity.