Demirhan, D.Ayar, Gülhan2026-01-102026-01-102019https://hdl.handle.net/20.500.12684/22194In recent years, Ricci flows (Bejan and Crasmareanu 2014) have been an interesting research topic in Mathematics especially in differential geometry. On a compact Riemannian manifold M with Riemannian metric g, the Ricci flow equation is given by ?g/?t=-2Ricg such that Ricg is defined as Ricci curvature tensor and t is time. A soliton which is similar to the Ricci flow and which moves only with a one-parameter of the diffeomorphism family and the family of scaling is called a Ricci soliton (Hamilton 1988). On a Riemannian manifold (M,g), the Ricci soliton is defined by (LYg)(X,Y)+2(S(X,Y)+2?g(X,Y)=0. such that S is the Ricci tensor associated to g (the Ricci tensor S is a constant multiple of g), LY denoted the Lie derivative operator along the vector field and ? is a real scalar (Nagaraja and Venu 2016).eninfo:eu-repo/semantics/closedAccessConference Object