On the Circuit Diameter Conjecture

TL;DR

This paper investigates the circuit diameter of polyhedra, establishing new bounds and conjectures, and explores how circuit-based properties relate to classical diameter conjectures, offering insights into their potential validity.

Contribution

It introduces the circuit diameter variant, proves implications of circuit analogues of key conjectures, and demonstrates bounds and equivalences that suggest the circuit version of the Hirsch conjecture may hold.

Findings

Circuit non-revisiting conjecture implies linear bound on unbounded polyhedra.

Circuit 4-step conjecture has two proven versions.

Circuit analogues of classical diameter conjectures are interconnected.

Abstract

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 $U_4$ with 8 facets. The Hirsch bound for bounded polyhedra was only recently disproved by Santos. 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 in general. A challenge in the circuit setting is that different realizations of polyhedra of 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.