A strong-weak duality for the 1d long-range Ising model
Abstract
We investigate the one-dimensional Ising model with long-range interactions decaying as . In the critical regime, for , this system realizes a family of nontrivial one-dimensional conformal field theories (CFTs), whose data vary continuously with . For the model has instead no phase transition at finite temperature, as in the short-range case. In the standard field-theoretic description, involving a generalized free field with quartic interactions, the critical model is weakly coupled near but strongly coupled in the vicinity of the short-range crossover at . We introduce a dual formulation that becomes weakly coupled as . Precisely at , the dual description becomes an exactly solvable conformal boundary condition of the two-dimensional free scalar. We present a detailed study of the dual model and demonstrate its effectiveness by computing perturbatively the CFT data near , up to next-to-next-to-leading order in , by two independent approaches: (i) standard renormalization of our dual field-theoretic description and (ii) the analytic conformal bootstrap. The two methods yield complete agreement.
Cite
@article{arxiv.2509.05250,
title = {A strong-weak duality for the 1d long-range Ising model},
author = {Dario Benedetti and Edoardo Lauria and Dalimil Mazac and Philine van Vliet},
journal= {arXiv preprint arXiv:2509.05250},
year = {2026}
}
Comments
74 pages, detailed version of arXiv:2412.12243. v2: published version