In this paper, we take into account the scalar curvature in the distributional sense ofIn this paper, we take into account the scalar curvature in the distributional sense of 14 and the scalar curvature lower bound in the Formula: see textweak Formula: see text sense of 6 on an asymptotically flat Formula: see text-manifold with a Formula: see text metric. Firstly, we demonstrate that the scalar curvature lower bound under the Ricci-DeTurck flow depends on the scalar curvature lower bound in the Formula: see textweak sense and the time. Then we prove that the lower bound of the distributional scalar curvature of a Formula: see text metric coincides with the lower bound of the scalar curvature in the Formula: see textweak sense.
Y. B. Li (Fri,) studied this question.