Proof of a conjecture of Voss on bridges of longest cycles

Abstract

Bridges are a classical concept in structural graph theory and play a fundamental role in the study of cycles. A conjecture of Voss from 1991 asserts that if disjoint bridges B1, B2, …, Bk of a longest cycle L in a 2-connected graph overlap in a tree-like manner (i.e., induce a tree in the overlap graph of L), then the total length of these bridges is at most half the length of L. Voss established this for k ≤ 3 and used it as a key tool in his 1991 monograph on cycles and bridges. In this paper, we confirm the conjecture in full via a reduction to a cycle covering problem.