Degrees of Freedom for Critical Random 2-SAT

Abstract

The random k-SAT problem serves as a model that represents the 'typical' k-SAT instances. This model is thought to undergo a phase transition as the clause density changes, and it is believed that the random k-SAT problem is primarily difficult to solve near this critical phase. In this paper, we introduce a weak formulation of degrees of freedom for random k-SAT problems and demonstrate that the critical random 2-SAT problem has [3]n degrees of freedom. This quantity represents the maximum number of variables that can be assigned truth values without affecting the formula's satisfiability. Notably, the value of [3]n differs significantly from the degrees of freedom in random 2-SAT problems sampled below the satisfiability threshold, where the corresponding value equals n. Thus, our result underscores the significant shift in structural properties and variable dependency as satisfiability problems approach criticality.