[[1] A. Barros, R. Batista, and E. Ribeiro Jr, Conformal almost Ricci solitons with constant scalar curvature are gradient, Monstsh Mat, 174, (2014), 29-39.10.1007/s00605-013-0581-3]Search in Google Scholar
[[2] N. Basu and A. Bhattacharyya, Conformal Ricci soliton in Kenmotsu manifold, Global Journal of Advanced Research on Classical and Modern Geometries, 4, (2015), 15-21.]Search in Google Scholar
[[3] C. L. Bejan and M. Crasmareanu, Ricci solitons in manifolds with quasi-constant curvature, Publ. Math. Debrecen, 78, (2011), 235-243.10.5486/PMD.2011.4797]Search in Google Scholar
[[4] A. Bhattacharyya and N. Basu, Some curvature identities on gradient shrinking conformal Ricci soliton, Analele Stiintifice Ale Universitatii Al. I. Cuza Din Iasi(S.N) Mathematica, Tomul LXI, 61, (2015), 245-252.10.2478/aicu-2014-0027]Search in Google Scholar
[[5] C. Calin and M. Crasmareanu, From the Eisenhart problem to the Ricci solitons in f-Kenmotsu manifolds, Bull. Malay. Math. Soc., 33, (2010), 361-368.]Search in Google Scholar
[[6] X. Cao, Compact gradient shrinking Ricci solitons with positive curvature operator, J. Geom. Anal., 17, (2007), 425-433.10.1007/BF02922090]Search in Google Scholar
[[7] B. Chow, P. Lu, and L. Ni, Hamilton’s Ricci ow, Graduate Studies in Mathematics, American Mathematical Society, Providence, RI; Science Press, New York, 77, (2006)10.1090/gsm/077]Search in Google Scholar
[[8] A. E. Fisher, An introduction to conformal Ricci ow, Class. quantum Grav., 21, (2004), S171-S218.10.1088/0264-9381/21/3/011]Search in Google Scholar
[[9] A. Ghosh, Kenmotsu 3-metric as a Ricci soliton, Chaos, Solitons and Fractals, 44, (2011), 647-650.10.1016/j.chaos.2011.05.015]Search in Google Scholar
[[10] R. S. Hamilton, Three manifold with positive Ricci curvature, J. Difierential Geom., 17, (1982), 255-306.10.4310/jdg/1214436922]Search in Google Scholar
[[11] R. S. Hamilton, The Ricci ow on surfaces, Contemporary Mathematics, 71, (1988), 237-261.10.1090/conm/071/954419]Search in Google Scholar
[[12] K. Kenmotsu, A class of almost contact Riemannian manifolds, Tohoku Math. J., 24, (1972), 93-103.10.2748/tmj/1178241594]Search in Google Scholar
[[13] H. G. Nagaraja and C. R. Premalatha, Ricci solitons in Kenmotsu manifolds, Journal of Mathematical Analysis, 3, (2012), 18-24.]Search in Google Scholar
[[14] Z. Olszak and R. Rosco, Normal locally conformal almost cosympletic manifolds, Publ. Math. Debrecen, 39, (1991), 315-323.10.5486/PMD.1991.39.3-4.12]Search in Google Scholar
[[15] G. Perelman, The entropy formula for geometry and its applications, arXiv:0211159v1, [mathDG], (2002.)]Search in Google Scholar
[[16] G. Perelman, Ricci ow on surgery on three manifolds, arXiv:0303109v1, [mathDG], (2003)]Search in Google Scholar
[[17] S. Pigola, M. Rigoli, M. Rimoldi, and A. G. Setti, Ricci almost solitons, arXiv:1003.2945v1, [mathDG], (2010)]Search in Google Scholar
[[18] B. B. Sinha and R. Sharma, On para-A-Einstein manifolds, Publications De L’Institut Mathematique, Nouvelle serie, 34-48, (1983), 211-215.]Search in Google Scholar
[[19] P. Topping, Lectures on the Ricci ow, Cambridge university press, Cambridge, UK, 2006.10.1017/CBO9780511721465]Search in Google Scholar
[[20] M. M. Tripathi, Ricci solitons in contact metric manifolds, arXiv:0801, 4222v1, [mathDG], (2008)]Search in Google Scholar
[[21] A. Yildiz, U.C. De, and M. Turan, On 3-dimensional f-Kenmotsu manifolds and Ricci solitons, Ukrain. Math. J., 65, (2013), 620-628.10.1007/s11253-013-0806-6]Search in Google Scholar