Restricted Hyperplane Sections of the Cross-Polytope and the Simplex
Abstract
We give a new proof of Webb's theorem on maximal central hyperplane sections of the regular \(n\)-simplex \(Δn\), viewed in its standard embedding in \( Rn+1\). A similar method also yields sharp maximal estimates for non-central sections of \(Δn\) whose distance \(d\) from the barycenter is small, namely d< 1(n+1)(2n+1). Moreover, we obtain sharp volume estimates for central hyperplane sections of the cross-polytope \(B1n\) that pass through the barycenter of a facet.
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