The infinite block spin Ising model
Abstract
We study a block mean-field Ising model with spins split into blocks, with Curie-Weiss interaction within blocks and nearest-neighbor coupling between blocks. While previous models deal with the block magnetization for a fixed number of blocks, we study the the simultaneous limit and . The model interpolates between Curie-Weiss model for , multi-species mean field for fixed , and the 1D Ising model for each spin in its own block at . Under mild growth conditions on , we prove a law of large numbers and a multivariate CLT with covariance given by the lattice Green's function. For instance, the high temperature CLT essentially covers the optimal range up to and the low temperature regime is new even for fixed number of blocks . In addition to the standard competition between entropy and energy, a new obstacle in the proofs is a curse of dimensionality as .
Keywords
Cite
@article{arxiv.2603.01994,
title = {The infinite block spin Ising model},
author = {Jonas Jalowy and Isabel Lammers and Matthias Löwe},
journal= {arXiv preprint arXiv:2603.01994},
year = {2026}
}