English

Inhomogeneous random 2-SAT

Combinatorics 2025-11-18 v2 Probability

Abstract

We introduce an inhomogeneous variant of random 2-SAT. Each variable v1,,vnv_1,\ldots,v_n is assigned a type from a state space Λ\Lambda, independently at random. Clause inclusion is governed by a symmetric measurable kernel WW on (Λ×{+,})2(\Lambda \times \{+,-\})^2, in analogy with the inhomogeneous random graph model of Bollob\'as, Janson, and Riordan: given literals i{vi,¬vi}\ell_i\in\{v_i,\neg v_i\} and j{vj,¬vj}\ell_j\in\{v_j,\neg v_j\}, the clause {i,j}\{\ell_i,\ell_j\} appears with probability W(type(i),type(j))/(2n)W(\mathrm{type}(\ell_i),\mathrm{type}(\ell_j))/(2n). In particular, for a variable viv_i of type xΛx\in\Lambda, the slices W((+,x),)W((+,x),\cdot) and W((,x),)W((-,x),\cdot) describe how viv_i and ¬vi\neg v_i interact with other literals. We identify a parameter ρ(W)\rho^*(W), defined as the spectral radius of an integral operator derived from WW, and show that ρ(W)<1\rho^*(W)<1 and ρ(W)>1\rho^*(W)>1 correspond to asymptotically almost surely satisfiable and unsatisfiable instances, respectively. The satisfiability threshold for homogeneous random 2-SAT is well-established, occurring when the ratio of clauses to variables is 11. This corresponds to a weight function of W1W \equiv 1 and a clause density of 1/(2n)1/(2n). Our result extends this classical result to a broad class of models controlled by types of variables.

Cite

@article{arxiv.2510.17656,
  title  = {Inhomogeneous random 2-SAT},
  author = {Jan Hladký and Petr Savický},
  journal= {arXiv preprint arXiv:2510.17656},
  year   = {2025}
}

Comments

42 pages, 3 figures

R2 v1 2026-07-01T06:47:52.392Z