On the self-overlap in vector spin glasses
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Publication:6123730
DOI10.1063/5.0196632arXiv2311.09880OpenAlexW4392560719MaRDI QIDQ6123730
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Publication date: 8 April 2024
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2311.09880
Cites Work
- The Aizenman-Sims-Starr scheme and Parisi formula for mixed \(p\)-spin spherical models
- Construction of pure states in mean field models for spin glasses
- Free energy of the spherical mean field model
- Free energy in the Potts spin Glass
- Free energy in the mixed \(p\)-spin models with vector spins
- Broken replica symmetry bounds in the mean field spin glass model
- Free energy in multi-species mixed \(p\)-spin spherical models
- Extending the Parisi formula along a Hamilton-Jacobi equation
- The Ghirlanda-Guerra identities for mixed \(p\)-spin model
- The Parisi formula for mixed \(p\)-spin models
- The Parisi formula
- Free states of the canonical anticommutation relations
- Hopf Formula and Multitime Hamilton-Jacobi Equations
- General properties of overlap probability distributions in disordered spin systems. Towards Parisi ultrametricity
- The Sherrington-Kirkpatrick Model
- The Parisi formula is a Hamilton–Jacobi equation in Wasserstein space
- Convex Analysis
- FREE ENERGY IN THE GENERALIZED SHERRINGTON–KIRKPATRICK MEAN FIELD MODEL
- The free energy in a multi-species Sherrington-Kirkpatrick model
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