Abstract
A Yamabe soliton is considered on an almost-contact complex Riemannian manifold (also known as an almost-contact B-metric manifold), which is obtained by a contact conformal transformation of the Reeb vector field, its dual contact 1-form, the B-metric, and its associated B-metric. A case in which the potential is a torse-forming vector field of constant length on the vertical distribution determined by the Reeb vector field is studied. In this way, manifolds from one of the main classes of the studied manifolds are obtained. The same class contains the conformally equivalent manifolds of cosymplectic manifolds by the usual conformal transformation of the given B-metric. An explicit five-dimensional example of a Lie group is given, which is characterized in relation to the obtained results.
Subject
Geometry and Topology,Logic,Mathematical Physics,Algebra and Number Theory,Analysis
Reference23 articles.
1. The Ricci flow on surfaces;Hamilton;Mathematics and General Relativity,1988
2. Chow, B., Lu, P., and Ni, L. (2006). Graduate Studies in Mathematics 77, Science Press.
3. On conformal solutions of the Yamabe flow;Barbosa;Arch. Math.,2013
4. On the structure of gradient Yamabe solitons;Cao;Math. Res. Lett.,2012
5. A note on Yamabe solitons;Chen;Balk. J. Geom. Appl.,2018
Cited by
1 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献