Entire self-expanders for power of σk curvature flow in Minkowski space
Abstract
In [19], we prove that if an entire, spacelike, convex hypersurface Mu0 has bounded principal curvatures, then the σk1/α (power of σk) curvature flow starting from Mu0 admits a smooth convex solution u for t>0. Moreover, after rescaling, the flow converges to a convex self-expander M=\(x, u(x)) x∈Rn\ that satisfies σk([M])=(-<X0, 0>)α. Unfortunately, the existence of self-expander for power of σk curvature flow in Minkowski space has not been studied before. In this paper, we fill the gap.
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