Abstract
In a [Formula: see text]-dimensional Lorentz–Finsler manifold with [Formula: see text]-Bakry–Émery Ricci curvature bounded from below, where [Formula: see text], using the Riccati equation techniques, we establish the Bishop–Gromov volume comparison theorem for the so-called standard sets for comparisons in Lorentzian volumes (SCLVs). We also establish the Günther volume comparison theorem for SCLVs when the flag curvature is bounded above.
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