English

The partial Ricci flow on one-dimensional foliations

Differential Geometry 2013-11-28 v3

Abstract

A flow of metrics, gtg_t, on a manifold is a solution of a differential equation \dtg=S(g)\dt g = S(g), where a geometric functional S(g)S(g) is a symmetric (0,2)(0,2)-tensor usually related to some kind of curvature. The mixed sectional curvature of a foliated manifold regulates the deviation of leaves along the leaf geodesics. We introduce and study the flow of metrics on a foliation (called the 'Partial Ricci Flow'), where S=2rS=-2 r and rr is the partial Ricci curvature of the foliation; in other words, the velocity for a unit vector XX orthogonal to the leaf, 2r(X,X)-2 r(X,X), is the mean value of sectional curvatures over all mixed planes containing XX. The flow preserves totally geodesic foliations and is used to examine the question: Which foliations admit a metric with a given property of mixed sectional curvature (e.g., point-wise constant)? This is related to Toponogov question about dimension of totally geodesic foliations with positive mixed sectional curvature. We first consider a one-dimensional foliation, since this case is easier. We prove local existence/uniqueness theorem, deduce the government equations for the curvature and conullity tensors (which are parabolic along the leaves), and show convergence of solution metrics for some classes of almost-product structures. For the warped product initial metric the global solution metrics converge to one with constant mixed sectional curvature.

Keywords

Cite

@article{arxiv.1308.0985,
  title  = {The partial Ricci flow on one-dimensional foliations},
  author = {Vladimir Rovenski and Vladimir Sharafutdinov},
  journal= {arXiv preprint arXiv:1308.0985},
  year   = {2013}
}

Comments

18 pages

R2 v1 2026-06-22T01:04:03.151Z