Abstract
We compare the different convergence criteria available for cluster expansions
of polymer gases subjected to hard-core exclusions, with emphasis on polymers defined as
finite subsets of a countable set (e.g. contour expansions and more generally high- and lowtemperature
expansions). In order of increasing strength, these criteria are: (i) Dobrushin
criterion, obtained by a simple inductive argument; (ii) Gruber-Kunz criterion obtained
through the use of Kirkwood-Salzburg equations, and (iii) a criterion obtained by two of
us via a direct combinatorial handling of the terms of the expansion. We show that for
subset polymers our sharper criterion can be proven both by a suitable adaptation of Dobrushin
inductive argument and by an alternative—in fact, more elementary—handling of
the Kirkwood-Salzburg equations. In addition we show that for general abstract polymers
this alternative treatment leads to the same convergence region as the inductive Dobrushin
argument and, furthermore, to a systematic way to improve bounds on correlations.
Original language | English |
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Pages (from-to) | 598-617 |
Number of pages | 20 |
Journal | Journal of Statistical Physics |
Volume | 139 |
DOIs | |
Publication status | Published - 2010 |