Pseudo-Riemannian Algebraic Ricci Solitons on Four-Dimensional Lie Groups
Youssef Ayad
TL;DR
This paper classifies pseudo-Riemannian algebraic Ricci solitons on four-dimensional Lie algebras, providing a complete description and examples of non-trivial and trivial solitons in this setting.
Contribution
It offers a comprehensive analysis of when pseudo-Riemannian algebraic Ricci solitons occur on four-dimensional Lie algebras, including explicit examples.
Findings
Complete classification of pseudo-Riemannian algebraic Ricci solitons in dimension four
Existence of non-trivial pseudo-Riemannian algebraic Ricci solitons
Identification of trivial (flat) algebraic Ricci solitons
Abstract
We investigate the conditions under which pseudo-Riemannian inner products induce pseudo-Riemannian algebraic Ricci solitons on four-dimensional Lie algebras. By analyzing the algebraic Ricci soliton equation for each four-dimensional Lie algebra, we obtain a complete description of when such pseudo-Riemannian algebraic Ricci solitons arise in dimension four. We present two applications of our formalism on a chosen four-dimensional Lie algebra by exhibiting a pseudo-Riemannian algebraic Ricci soliton and a flat pseudo-Riemannian inner product, which is a trivial algebraic Ricci soliton.
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Taxonomy
TopicsGeometric Analysis and Curvature Flows · Advanced Differential Geometry Research · Homotopy and Cohomology in Algebraic Topology