Approximate Lifshitz law for the zero-temperature stochastic Ising model in any dimension
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Publication:1942287
DOI10.1007/s00220-013-1667-4zbMath1266.82037arXiv1102.3466OpenAlexW2074090455MaRDI QIDQ1942287
Publication date: 18 March 2013
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1102.3466
Related Items (4)
The Heat Equation Shrinks Ising Droplets to Points ⋮ Coarsening model on \({\mathbb{Z}^{d}}\) with biased zero-energy flips and an exponential large deviation bound for ASEP ⋮ Log‐Sobolev inequality for near critical Ising models ⋮ Zero-temperature 2D stochastic Ising model and anisotropic curve-shortening flow
Cites Work
- Mixing times of lozenge tiling and card shuffling Markov chains
- Stretched exponential fixation in stochastic Ising models at zero temperature
- Quasi-polynomial mixing of the 2D stochastic Ising model with ``plus boundary up to criticality
- Zero-temperature 2D stochastic Ising model and anisotropic curve-shortening flow
- “Zero” temperature stochastic 3D ising model and dimer covering fluctuations: A first step towards interface mean curvature motion
- Convergence to equilibrium of biased plane Partitions
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