On Circuit Diameter Bounds via Circuit Imbalances

Abstract

We study the circuit diameter of polyhedra, introduced by Borgwardt, Finhold, and Hemmecke (SIDMA 2015) as a relaxation of the combinatorial diameter. We show that the circuit diameter of a system \x ∈ Rn: Ax=b, 0≤ x≤ u\ for A ∈ Rm × n is bounded by O(m \m, n-m\ (m+ A)+n n), where A is the circuit imbalance measure of the constraint matrix. This yields a strongly polynomial circuit diameter bound if e.g., all entries of A have polynomially bounded encoding length in n. Further, we present circuit augmentation algorithms for LPs using the minimum-ratio circuit cancelling rule. Even though the standard minimum-ratio circuit cancelling algorithm is not finite in general, our variant can solve an LP in O(mn2(n+A)) augmentation steps.