We show that the scalar curvature of a Riemannian manifold $M$ is constant if it satisfies (i) the concircular field equation and $M$ is compact, (ii) the special concircular field equation. Finally, we show that, if a complete connected Riemannian manifold admits a concircular non-isometric vector field leaving the scalar curvature invariant, and the conformal function is special concircular, then the scalar curvature is a constant.
Scalar curvature concircular vector field concircular scalar equation gradient Yamabe soliton
Primary Language | English |
---|---|
Subjects | Mathematical Sciences |
Journal Section | Research Article |
Authors | |
Publication Date | April 15, 2021 |
Acceptance Date | December 26, 2020 |
Published in Issue | Year 2021 |