Colored Stallings graphs and Counterexamples to Stallings equalizer conjecture

Abstract

The famous Stallings equalizer conjecture has remained open for more than 40 years, which states that, for any free group \(Fn\) of rank \(n 2\), any free group \(F\), and any two monomorphisms g,h:Fn F, the equalizer (g,h)=\w∈ Fn g(w)=h(w)\ satisfies (g,h) n. The only known case is n=2, due to A. D. Logan in 2022. By introducing the notion of colored Stallings graphs, we show that for every integer \(n 2\) there exist monomorphisms g,h:Fn F2 such that(g,h) 2n-2. This disproves Stallings equalizer conjecture for n 3.