Ivailo Hartarsky
Published 2021-04-16Version 1
The bisection method for kinetically constrained models (KCM) of Cancrini, Martinelli, Roberto and Toninelli is a vital technique applied also beyond KCM. In this note we present a new way of performing it, based on a novel two-block dynamics with a probabilistic proof instead of the original spectral one. We illustrate the method by very directly proving an upper bound on the relaxation time of KCM like the one for the East model in a strikingly general setting. Namely, we treat KCM on finite or infinite one-dimensional volumes, with any boundary condition, conditioned on any of the irreducible components of the state space, with arbitrary site-dependent state spaces and, most importantly, arbitrary inhomogeneous rules.
Kinetically constrained models out of equilibrium
Towards a universality picture for the relaxation to equilibrium of kinetically constrained models
An upper bound on the two-arms exponent for critical percolation on $\mathbb{Z}^d$
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