Edge-Graph Diameter Bounds for Convex Polytopes with Few Facets

Bremner, David; Schewe, Lars

doi:10.1080/10586458.2011.564965

Cited by 13 publications

(56 citation statements)

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“…Klee and Walkup proved the d-step Conjecture for d ≤ 5, and the case d = 6 has recently been verified by Bremner and Schewe [9]. In a previous paper [31], Klee had shown the Hirsch Conjecture for d = 3.…”

Section: Introductionmentioning

confidence: 93%

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A counterexample to the Hirsch Conjecture

2012

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The Hirsch Conjecture (1957) stated that the graph of a d-dimensional polytope with n facets cannot have (combinatorial) diameter greater than n − d. That is, any two vertices of the polytope can be connected by a path of at most n − d edges.This paper presents the first counterexample to the conjecture. Our polytope has dimension 43 and 86 facets. It is obtained from a 5-dimensional polytope with 48 facets that violates a certain generalization of the d-step conjecture of Klee and Walkup.

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Section: Introductionmentioning

confidence: 93%

“…In a previous paper [31], Klee had shown the Hirsch Conjecture for d = 3. Together with the cases (n, d) ∈ {(11, 4), (12, 4)} [8], [9], these are all the parameters where the Hirsch Conjecture is known to hold.…”

Section: Introductionmentioning

confidence: 99%

A counterexample to the Hirsch Conjecture

2012

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“…Our approach is computational and builds on the approach used by Bremner and Schewe [2]. As in [2], we reduce the determination of (d, n) to a set of simplicial complex realizability problems.…”

Section: Introductionmentioning

confidence: 99%

“…Email: deza@mcmaster.ca Table 1. Previously known bounds on (d, n) [2,9,11,16]. 0 1 2 3 4 4 4 5 5 6 7 + 5 5 6 7-8 7+ 8+ 6 6 7-9 8+ 9+ 9+ 7 7-10 8+ 9+ 10+ 11+ 8 8 + 9+ 10+ 11+ 12+ abstract models [7,8,13] to study linear optimization has recently achieved the exciting result of a subexponential lower bound for Zadeh's rule [8], another long-standing open problem.…”

Section: Introductionmentioning

confidence: 99%

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More bounds on the diameters of convex polytopes

Bremner

Deza

Hua

et al. 2013

Optimization Methods and Software

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Let ∆(d, n) be the maximum possible edge diameter over all d-dimensional polytopes defined by n inequalities. The Hirsch conjecture, formulated in 1957, suggests that ∆(d, n) is no greater than n − d. No polynomial bound is currently known for ∆(d, n), the best one being quasipolynomial due to Kalai and Kleitman in 1992. Goodey showed in 1972 that ∆(4, 10) = 5 and ∆(5, 11) = 6, and more recently, Bremner and Schewe showed ∆(4, 11) = ∆(6, 12) = 6. In this follow-up, we show that ∆(4, 12) = 7 and present strong evidence that ∆(5, 12) = ∆(6, 13) = 7.

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On the Circuit Diameter Conjecture

Borgwardt

Stephen

Yusun

2018

Discrete Comput Geom

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From the point of view of optimization, a critical issue is relating the combinatorial diameter of a polyhedron to its number of facets f and dimension d. In the seminal paper of Klee and Walkup [KW67], the Hirsch conjecture of an upper bound of f − d was shown to be equivalent to several seemingly simpler statements, and was disproved for unbounded polyhedra through the construction of a particular 4-dimensional polyhedron U4 with 8 facets. The Hirsch bound for bounded polyhedra was only recently disproved by Santos [San12]. We consider analogous properties for a variant of the combinatorial diameter called the circuit diameter. In this variant, the walks are built from the circuit directions of the polyhedron, which are the minimal non-trivial solutions to the system defining the polyhedron. We are able to prove that circuit variants of the so-called non-revisiting conjecture and d-step conjecture both imply the circuit analogue of the Hirsch conjecture. For the equivalences in [KW67], the wedge construction was a fundamental proof technique. We exhibit why it is not available in the circuit setting, and what are the implications of losing it as a tool. Further, we show the circuit analogue of the non-revisiting conjecture implies a linear bound on the circuit diameter of all unbounded polyhedra -in contrast to what is known for the combinatorial diameter. Finally, we give two proofs of a circuit version of the 4-step conjecture. These results offer some hope that the circuit version of the Hirsch conjecture may hold, even for unbounded polyhedra. A challenge in the circuit setting is that different realizations of polyhedra with the same combinatorial structure may have different diameters. We adapt the notion of simplicity to work with circuits in the form of C-simple and wedge-simple polyhedra. We show that it suffices to consider such polyhedra for studying circuit analogues of the Hirsch conjecture. MSC[2012]: 52B05, 90C05

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Edge-Graph Diameter Bounds for Convex Polytopes with Few Facets

Cited by 13 publications

References 10 publications

A counterexample to the Hirsch Conjecture

A counterexample to the Hirsch Conjecture

More bounds on the diameters of convex polytopes

On the Circuit Diameter Conjecture

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