Almost Ricci–Yamabe soliton on contact metric manifolds
Article Properties
-
LanguageEnglish
-
DOI (url)
-
Publication Date2024/04/03
-
Indian UGC (journal)
-
Refrences30
-
Mohan Khatri ORCID (unauthenticated)
-
Jay Prakash Singh
Abstract
Cite
Khatri, Mohan, and Jay Prakash Singh. “Almost Ricci–Yamabe Soliton on contact Metric Manifolds”. Arab Journal of Mathematical Sciences, 2024, https://doi.org/10.1108/ajms-07-2022-0171.
Khatri, M., & Singh, J. P. (2024). Almost Ricci–Yamabe soliton on contact metric manifolds. Arab Journal of Mathematical Sciences. https://doi.org/10.1108/ajms-07-2022-0171
Khatri, Mohan, and Jay Prakash Singh. “Almost Ricci–Yamabe Soliton on contact Metric Manifolds”. Arab Journal of Mathematical Sciences, 2024. https://doi.org/10.1108/ajms-07-2022-0171.
Khatri M, Singh JP. Almost Ricci–Yamabe soliton on contact metric manifolds. Arab Journal of Mathematical Sciences. 2024;.
Journal Category
Science
Mathematics
Refrences
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| On Ricci–Yamabe soliton and geometrical structure in a perfect fluid spacetime | Afrika Matematika |
| 13 | 2021 |
| Ricci–Yamabe maps for Riemannian flows and their volume variation and volume entropy | Turkish Journal of Mathematics |
| 39 | 2019 |
| Certain results on generalized $${\varvec{(k,\,\mu )}}$$ ( k , μ ) -contact metric manifolds | Journal of Geometry |
| 3 | 2017 |
| Generalized m-quasi-Einstein metric within the framework of Sasakian and K-contact manifolds | Annales Polonici Mathematici |
| 9 | 2015 |
| Certain Contact Metrics as Ricci Almost Solitons | Results in Mathematics |
| 27 | 2014 |
Refrences Analysis
| Category | Category Repetition |
|---|---|
| Science: Mathematics | 10 |
| Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods | 3 |
| Science: Physics | 1 |
The category
Science: Mathematics 10
is the most frequently represented among the references in this article. It primarily includes studies from Journal of Geometry and Tohoku Mathematical Journal. The chart below illustrates the number of referenced publications per year.