Improved Mixing of Critical Hardcore Model

The hardcore model is one of the most classic and widely studied examples of undirected graphical models. Given a graph $G$, the hardcore model describes a Gibbs distribution of $\lambda$-weighted independent sets of $G$. In the last two decades, a beautiful computational phase transition has been established at a precise threshold $\lambda_c(\Delta)$ where $\Delta$ denotes the maximum degree, where the task of sampling independent sets transfers from polynomial-time solvable to computationally intractable. We study the critical hardcore model where $\lambda = \lambda_c(\Delta)$ and show that the Glauber dynamics, a simple yet popular Markov chain algorithm, mixes in $\tilde{O}(n^{7.44 + O(1/\Delta)})$ time on any $n$-vertex graph of maximum degree $\Delta\geq3$, significantly improving the previous upper bound $\tilde{O}(n^{12.88+O(1/\Delta)})$ by the recent work arXiv:2411.03413. The core property we establish in this work is that the critical hardcore model is $O(\sqrt{n})$-spectrally independent, improving the trivial bound of $n$ and matching the critical behavior of the Ising model. Our proof approach utilizes an online decision-making framework to study a site percolation model on the infinite $(\Delta-1)$-ary tree, which can be interesting by itself.