Bounds for the Zero-Forcing Number of Graphs with Large Girth

Abstract

We investigate the zero-forcing number for triangle-free graphs. We improve upon the trivial bound, δ Z(G) where δ is the minimum degree, in the triangle-free case. In particular, we show that 2 δ - 2 Z(G) for graphs with girth of at least 5, and this can be further improved when G has a small cut set. Using these results, we are able to prove the Graph Complement Conjecture on minimum rank for a large class of graphs. Lastly, we make a conjecture that the lower bound for Z(G) increases as a function of the girth, g, and δ.