Non-central sections of the regular n-simplex
Abstract
We show that the maximal non-central hyperplane sections of the regular n-simplex of side-length sqrt 2 at a fixed distance t to the centroid are those parallel to a face of the simplex, if (n-2)/(3(n+1)) < t < (n-1)/(2(n+1)) and n>4. For n=4, the same is true in a slightly smaller range for t. This adds to a previous result for (n-1)/(2(n+1)) < t < n/(n+1). For n=2,3, we determine the maximal and the minimal sections for all distances t to the centroid.
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