Complete Classification of the Symmetry Group of Lp-Minkowski Problem on the Sphere
Abstract
In Convex Geometry, a core topic is the Lp-Minkowski problem equatione0.1 (∇2h+hI)=fhp-1, \ \ ∀ X∈Sn, \ \ ∀ p∈ R equation of Monge-Amp\`ere type. By the transformation u(x)=h(X)1+|x|2 and semi-spherical projection, equation e0.1 can be reformulated by the Monge-Amp\`ere type equation equatione0.2 D2u=(1+|x|2)-p+n+12up-1, \ \ ∀ x∈Rn, \ \ ∀ p∈ R equation on the Euclidean space. In this paper, we will firstly determine the symmetric groups of n-dimensional fully nonlinear equation e0.2 without asymptotic growth assumption. After proving several key resolution lemmas, we thus completely classify the symmetric groups of the Lp-Minkowski problem. Our method develops the Lie theory to fully nonlinear PDEs in Convex Geometry.
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