
arXiv: 2504.04931
In this paper, we investigate an $L_{p}$ Christoffel-Minkowski-type problem that prescribes a class of $L_p$ geometric measures, which are mixtures of the $k$-th area measure and the $q$-th dual curvature measure. By establishing a gradient estimate, we obtain the existence of an even, smooth, strictly convex solution to this problem for $1 < p < q \leq k + 1$, where $1 \leq k \leq n$ and $n \geq 1$.
Analysis of PDEs, Uniqueness problems for PDEs: global uniqueness, local uniqueness, non-uniqueness, Convex sets in \(n\) dimensions (including convex hypersurfaces), Global surface theory (convex surfaces à la A. D. Aleksandrov), Differential Geometry
Analysis of PDEs, Uniqueness problems for PDEs: global uniqueness, local uniqueness, non-uniqueness, Convex sets in \(n\) dimensions (including convex hypersurfaces), Global surface theory (convex surfaces à la A. D. Aleksandrov), Differential Geometry
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