On the evolution of convex hypersurfaces by the Qk flow
Abstract
We prove the existence and uniqueness of a C1,1 solution of the Qk flow in the viscosity sense for compact convex hypersurfaces t embedded in Rn+1 (n ≥ 2) . In particular, for compact convex hypersurfaces with flat sides we show that, under a certain non-degeneracy initial condition, the interface separating the flat from the strictly convex side, becomes smooth, and it moves by the Qk-1 flow at least for a short time.
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