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Kinetically constrained spin models on trees
release_min2fnciefdv3bzkvdhldjsxny
by
F. Martinelli,
C. Toninelli
Released
as a report
.
2012
Abstract
We analyze kinetically constrained 0-1 spin models (KCSM) on rooted and
unrooted trees of finite connectivity. We focus in particular on the class of
Friedrickson-Andersen models FA-jf and on an oriented version of them. These
tree models are particularly relevant in physics literature since some of them
undergo an ergodicity breaking transition with the mixed first-second order
character of the glass transition. Here we first identify the ergodicity regime
and prove that the critical density for FA-jf and OFA-jf models coincide with
that of a suitable bootstrap percolation model. Next we prove for the first
time positivity of the spectral gap in the whole ergodic regime via a novel
argument based on martingales ideas. Finally, we discuss how this new technique
can be generalized to analyze KCSM on the regular lattice Z^d.
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