Limiting shape of the Lp-Minkowski problem
Abstract
Ben Andrews classified the limiting shape for isotropic curvature flow corresponding to the solutions of the Lp-Minkowski problem as p-∞ in the planar case. In this paper, we use the group-invariant method to study the asymptotic shape of solutions to the Lp-Minkowski problem as p-∞ in high dimensions. For any regular polytope T, we establish the existence of a solution (p) to the Lp-Minkowski problem that converges to T as p-∞, thereby revealing the intricate geometric structure underlying this limiting behavior. We also extend the result to the dual Minkowski problem.
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