The geometry of the Sasaki metric on the sphere bundle of Euclidean Atiyah vector bundles

Abstract

Let (M,,TM) be a Riemannian manifold. It is well-known that the Sasaki metric on TM is very rigid but it has nice properties when restricted to T(r)M=\u∈ TM,|u|=r \. In this paper, we consider a general situation where we replace TM by a vector bundle E M endowed with a Euclidean product ,E and a connection ∇E which preserves ,E. We define the Sasaki metric on E and we consider its restriction h to E(r)=\a∈ E, a,aE=r2 \. We study the Riemannian geometry of (E(r),h) generalizing many results first obtained on T(r)M and establishing new ones. We apply the results obtained in this general setting to the class of Euclidean Atiyah vector bundles introduced by the authors in arXiv preprint arXiv:1808.01254 (2018). Finally, we prove that any unimodular three dimensional Lie group G carries a left invariant Riemannian metric such that (T(1)G,h) has a positive scalar curvature.