In this manuscript we consider non-degenerate surfaces Σ2 immersed in a 3-dimensional homogeneous space L3(κ,τ) endowed with two different metrics, the one induced by the Riemannian metric of E3(κ,τ) and the non-degenerate metric inherited by the Lorentzian one of L3(κ,τ). Therefore, we have two different geometries on Σ2 and we can compare them. In particular, we can consider the Gaussian curvature functions which respect to both metrics and study the geometry of the surfaces satisfying that both Gaussian curvature functions are opposite. We will call these surfaces anisocurved surfaces. In order to obtain our main results we also need to impose some extra assumptions regarding the extrinsic curvatures with respect to both metrics.
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