On subspace concentration for dual curvature measures
Abstract
We study subspace concentration of dual curvature measures of convex bodies K satisfying γ (-K)⊂eq K for some γ ∈ (0,1]. We present upper bounds on the subspace concentration depending on γ, which, in particular, retrieves the known results in the symmetric setting. The proof is based on a unified approach to prove necessary subspace concentration conditions via the divergence theorem.
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