Sublinear bounds for nullity of flows and approximating Tutte's flow conjectures

Abstract

A function f:N→ N is sublinear, if \[x→ +∞f(x)x=0.\] If A is an Abelian group, G is a graph and φ is an A-flow in G, then let N(φ) be the nullity of φ, that is, the set of edges e of G with φ(e)=0. In this paper we show that (a) Tutte's 5-flow conjecture is equivalent to the statement that there is a sublinear function f, such that all 3-edge-connected cubic graphs admit a Z5-flow φ (not necessarily no-where zero), such that |N(φ)|≤ f(|E(G)|); (b) Tutte's 4-flow conjecture is equivalent to the statement that there is a sublinear function f, such that all bridgeless graphs without a Petersen minor admit a Z4-flow φ (not necessarily no-where zero), such that |N(φ)|≤ f(|E(G)|); (c) Tutte's 3-flow conjecture is equivalent to the statement that there is a sublinear function f, such that all 4-edge-connected graphs admit a Z3-flow φ (not necessarily no-where zero), such that |N(φ)|≤ f(|E(G)|).