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Order by disorder up to arbitrarily high temperature

Published 30 Apr 2026 in cond-mat.stat-mech | (2604.28026v1)

Abstract: We prove that a class of classical lattice models on $\mathbb{Z}d$ ($d \geq 2$) with on-site space $\mathbb{N}_0$ exhibits long-range checkerboard order at sufficiently high temperature. The model has a nearest-neighbour interaction $f : \mathbb{N}_0 \times \mathbb{N}_0 \to [0,\infty)$ satisfying four structural conditions, subsuming the recently introduced power-law model of Han--Huang--Komargodski--Lucas--Popov (arXiv:2503.22789) as a special case. The ordering mechanism is purely entropic: the checkerboard configurations are not energy minimisers, but are selected by the partial trace over occupation numbers in the $β\to 0$ limit. The proof uses Pirogov--Sinai theory and the key input is a Peierls bound.

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