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In 1994, Vel\'azquez constructed a countable family of complete hypersurfaces flowing in R^2N (N 4) by mean curvature, each of which develops a type II singularity at the origin in finite time. Later Guo and Sesum showed that for a non-empty subset of Vel\'azquez's solutions, the mean curvature blows up near the origin, at a rate smaller than that of the second fundamental form; recently Stolarski proved another subset of these solutions has bounded mean curvature up to the singular time. In this paper, we follow their arguments to construct compact mean curvature flow solutions in Rⁿ (n 8) with bounded mean curvature.
Zichang Liu (Mon,) studied this question.