Non-orderability of random triangular groups by using random 3CNF formulas

Abstract

We show that a random group in the triangular binomial model (n, p) is a.a.s. not left-orderable for p∈(cn-2, n-3/2-), where c, are any constants satisfying >0, c>(1/8)4/32≈ 0.3012. We also prove that if p≥ (1+)( n)n-2 for any fixed >0, then a random ∈ (n,p) has a.a.s. no non-trivial left-orderable quotients. We proceed by constructing 3CNF formulas, which encode necessary conditions for left-orderability and then proving their unsatisfiability a.a.s.