We review the problem of determining the ground states of two-dimensional Ising models with nearest neighbor ferromagnetic and dipolar interactions, and prove a new result supporting the conjecture that, if the nearest neighbor coupling J is sufficiently large, the ground states are periodic and “striped”. More precisely, we prove a restricted version of the conjecture, by constructing the minimizers within the variational class of states whose domain walls are arbitrary collections of horizontal and/or vertical straight lines.
Periodic striped states in Ising models with dipolar interactions
Fermi, Davide;Giuliani, Alessandro
2022-01-01
Abstract
We review the problem of determining the ground states of two-dimensional Ising models with nearest neighbor ferromagnetic and dipolar interactions, and prove a new result supporting the conjecture that, if the nearest neighbor coupling J is sufficiently large, the ground states are periodic and “striped”. More precisely, we prove a restricted version of the conjecture, by constructing the minimizers within the variational class of states whose domain walls are arbitrary collections of horizontal and/or vertical straight lines.File in questo prodotto:
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