Bounds on the diameters of r-stacked and k-neighborly polytopes

Abstract

We improve Larman's bound on the diameter of a polytope by showing that if is a normal simplicial complex, all of whose missing faces have size at most r, then the diameter of the facet-ridge graph of is not larger than 2r-2n, where n is the number of vertices of . We then use this result to provide new upper bounds on the diameters of the facet-ridge graphs of k-neighborly spheres, r-stacked spheres, and polytopes with small gr. Specifically, our bounds imply that r-stacked spheres with r=O( n) satisfy the polynomial Hirsch conjecture.