Abstract
Let Δ(d, n) be the maximum diameter of the graph of ad-dimensional polyhedronP withn-facets. It was conjectured by Hirsch in 1957 that Δ(d, n) depends linearly onn andd. However, all known upper bounds for Δ(d, n) were exponential ind. We prove a quasi-polynomial bound Δ(d, n)≤n 2 logd+3.
LetP be ad-dimensional polyhedron withn facets, let ϕ be a linear objective function which is bounded onP and letv be a vertex ofP. We prove that in the graph ofP there exists a monotone path leading fromv to a vertex with maximal ϕ-value whose length is at most\(n^{2\sqrt n } \).
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This research was supported in part by a BSF grant, by a GIF grant, and by ONR-N00014-91-C0026.
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Kalai, G. Upper bounds for the diameter and height of graphs of convex polyhedra. Discrete Comput Geom 8, 363–372 (1992). https://doi.org/10.1007/BF02293053
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DOI: https://doi.org/10.1007/BF02293053