Remarks on Scalar Curvature and Concircular Field Equation

Ramesh Sharma; Sharief Deshmukh

doi:10.36890/IEJG.906792

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Remarks on Scalar Curvature and Concircular Field Equation

Journal article

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Remarks on Scalar Curvature and Concircular Field Equation

Ramesh Sharma and Sharief Deshmukh

INTERNATIONAL ELECTRONIC JOURNAL OF GEOMETRY, Vol.14(1), pp.121-124

15/04/2021

DOI: https://doi.org/10.36890/IEJG.906792

Abstract

Mathematics

Physical Sciences

Science & Technology

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.

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Title: Remarks on Scalar Curvature and Concircular Field Equation
Creators - without role: Ramesh Sharma - University of New Haven
Sharief Deshmukh - King Saud University
Publication Details: INTERNATIONAL ELECTRONIC JOURNAL OF GEOMETRY, Vol.14(1), pp.121-124
Publisher: Int Electronic Journal Geometry
Number of pages: 4
Identifiers: 9950551608331
Academic Unit: King Saud University
Language: English
Resource Type: Journal article