@article{Poddar_Balasubramanian_Sharma_2023, title={Yamabe solitons in contact geometry}, volume={54}, url={https://nzjmath.org/index.php/NZJMATH/article/view/286}, DOI={10.53733/286}, abstractNote={<p>It is shown that the scalar curvature of a Yamabe soliton as a Sasakian manifold is constant and the soliton vector field is Killing. The same conclusion is shown to hold for a Yamabe soliton as a $K$-contact manifold $M^{2n+1}$ if any one of the following conditions hold: (i) its scalar curvature is constant along the soliton vector field $V$, (ii) $V$ is an eigenvector of the Ricci operator with eigenvalue $2n$, (iii) $V$ is gradient.</p>}, journal={New Zealand Journal of Mathematics}, author={Poddar, Rahul and Balasubramanian, S. and Sharma, Ramesh}, year={2023}, month={Dec.}, pages={49–55} }