An Integral Formula for a Riemannian Manifold with $k>2$ Singular Distributions
- 1 January 2021
- journal article
- Published by Prof. Marin Drinov Publishing House of BAS (Bulgarian Academy of Sciences) in Geometry, Integrability and Quantization
Abstract
Mathematicians have shown interest in manifolds endowed with several distributions, e.g., webs composed of different regular foliations and multiply warped products, as well as distributions having variable dimensions (e.g., singular Riemannian foliations). In this paper, we extend our previous study of the mixed scalar curvature of two orthogonal singular distributions for the case of $k>2$ singular (or regular) pairwise orthogonal distributions, prove an integral formula with this kind of curvature, and illustrate it by characterizing autoparallel singular distributions.