<p>We consider mean-field vector spin glasses with possibly non-convex interactions. Up to a small perturbation of the parameters defining the model, the asymptotic behavior of the Gibbs measure is described in terms of a critical point of an explicit functional. In this paper, we study some properties of these critical points. Under modest assumptions ensuring that different types of spins interact, we show that the replica-symmetry-breaking structures of the different types of spins are in one-to-one correspondence with one another. For instance, if some type of spins displays one level of replica-symmetry breaking, then so do all the other types of spins. This extends the recent results of Bates and Sohn (Electron J Probab 27:1–75, 2022) and Bates and Sohn (Commun Math Phys 394:1101–1152, 2022) that were obtained in the case of multi-species spherical spin glasses with convex interactions.</p>

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Simultaneous Replica-Symmetry Breaking for Vector Spin Glasses

  • Hong-Bin Chen,
  • Jean-Christophe Mourrat

摘要

We consider mean-field vector spin glasses with possibly non-convex interactions. Up to a small perturbation of the parameters defining the model, the asymptotic behavior of the Gibbs measure is described in terms of a critical point of an explicit functional. In this paper, we study some properties of these critical points. Under modest assumptions ensuring that different types of spins interact, we show that the replica-symmetry-breaking structures of the different types of spins are in one-to-one correspondence with one another. For instance, if some type of spins displays one level of replica-symmetry breaking, then so do all the other types of spins. This extends the recent results of Bates and Sohn (Electron J Probab 27:1–75, 2022) and Bates and Sohn (Commun Math Phys 394:1101–1152, 2022) that were obtained in the case of multi-species spherical spin glasses with convex interactions.