Phase Transitions on 1d Long-Range Ising Models with Decaying Fields: A Direct Proof via Contours

Phase Transitions on 1d Long-Range Ising Models with Decaying Fields: A Direct Proof via Contours

Following seminal work by J. Fr\"ohlich and T. Spencer on the critical exponent $\alpha=2$, we give a proof via contours of phase transition in the one-dimensional long-range ferromagnetic Ising model in the entire region of decay, where phase transition is known to occur, i.e., polynomial deca...

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Hauptverfasser: Affonso, Lucas, Bissacot, Rodrigo, Corsini, Henrique, Welsch, Kelvyn
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Mathematical Physics
Mathematics - Probability
Physics - Mathematical Physics
Physics - Statistical Mechanics
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Zusammenfassung:Following seminal work by J. Fr\"ohlich and T. Spencer on the critical exponent $\alpha=2$, we give a proof via contours of phase transition in the one-dimensional long-range ferromagnetic Ising model in the entire region of decay, where phase transition is known to occur, i.e., polynomial decay $\alpha \in (1,2]$. No assumptions that the nearest-neighbor interaction $J(1)$ is large are made. The robustness of the method also yields a proof of phase transition in the presence of a nonsummable external field that decays sufficiently fast.
DOI:10.48550/arxiv.2412.07098