The dual Derrida-Retaux conjecture

Abstract

We consider a recursive system (Xn) which was introduced by Collet et al. [10] as a spin glass model, and later by Derrida, Hakim, and Vannimenus [13] and by Derrida and Retaux [14] as a simplified hierarchical renormalization model. The system (Xn) is expected to possess highly nontrivial universalities at or near criticality. In the nearly supercritical regime, Derrida and Retaux [14] conjectured that the free energy of the system decays exponentially with exponent (p-pc)-12 as p pc. We study the nearly subcritical regime (p pc) and aim at a dual version of the Derrida-Retaux conjecture; our main result states that as n ∞, both (Xn) and (Xn≠ 0) decay exponentially with exponent (pc-p)12 +o(1), where o(1) 0 as p pc.