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The goal of this paper is to study the geometry of the connected unit component of the real general linear Lie group 4 dimensional G₀ as a Lorentzian and flat affine manifold. As the group G₀ is naturally equipped with a bi-invariant Hessian metric k^+, relative to a bi-invariant flat affine structure, we examine both structures and the relationships between them. Both structures are defined using the Lie algebra g, the first one through the trace k (u, v): =trace (u v) and the second by the composition ₔ^+v^+: = (u v) ^+, where u, v. The curvatures, tidal force, and Jacobi vector fields of (G₀, k^+) are determined in Section 1. Section 2 discusses the causal structure of k^+, while Section 3 focuses on the developed map relative to in the sense of C. Ehresmann.
Gago et al. (Sat,) studied this question.