Ricci Solitons on a family of three dimensional Lorentzian Walker manifolds
A. Diatta, M. Ciss, A. S. Diallo
TL;DR
This paper demonstrates the existence of non-trivial Ricci solitons on a specific family of three-dimensional Lorentzian Walker manifolds, expanding understanding of Ricci solitons in pseudo-Riemannian geometry.
Contribution
It establishes the existence of non-trivial Ricci solitons on a new class of three-dimensional Lorentzian Walker manifolds, which was previously unexplored.
Findings
Existence of non-trivial Ricci solitons on these manifolds
Characterization of the Ricci solitons in this setting
Extension of Ricci soliton theory to Lorentzian Walker manifolds
Abstract
A Ricci soliton is a natural generalization of an Einstein metric. On a pseudo-Riemannian manifold (M, g), it is defined by : $LX g + \r{ho} = {\lambda} g, where X is a smooth vector field on M , LX denotes the Lie derivative in the direction of X, \r{ho} is the Ricci tensor, and {\lambda} is a real constant. In this paper, we establish the existence of non-trivial Ricci solitons on a family of three-dimensional Lorentzian Walker manifolds.
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