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Comparison and disjoint-occurrence inequalities for random-cluster models (1995)

Grimmett, Geoffrey

Springer

Journal of statistical physics 78 (1995), S. 1311-1324

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ISSN: 1572-9613

Keywords: Random-cluster model ; Ising model ; Potts model ; comparison inequality ; BK inequality ; FKG inequality

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract A principal technique for studying percolation, (ferromagnetic) Ising, Potts, and random-cluster models is the FKG inequality, which implies certain stochastic comparison inequalities for the associated probability measures. The first result of this paper is a new comparison inequality, proved using an argument developed elsewhere in order to obtain strict inequalities for critical values. As an application of this inequality, we prove that the critical pointp c (q) of the random-cluster model with cluster-weighting factorq (≥1) is strictly monotone inq. Our second result is a “BK inequality” for the disjoint occurrence of increasing events, in a weaker form than that available in percolation theory.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02180133

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Percolation and Minimal Spanning Trees (1998)

Bezuidenhout, Carol ; Grimmett, Geoffrey ; Löffler, Armin

Springer

Journal of statistical physics 92 (1998), S. 1-34

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ISSN: 1572-9613

Keywords: Percolation ; minimal spanning tree ; free energy ; critical value

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract Consider a random set $$V_n $$ of points in the box [n, −n) d , generated either by a Poisson process with density p or by a site percolation process with parameter p. We analyze the empirical distribution function F n of the lengths of edges in a minimal (Euclidean) spanning tree $$T_n $$ on $$V_n$$ . We express the limit of F n, as n → ∞, in terms of the free energies of a family of percolation processes derived from $$V_n$$ by declaring two points to be adjacent whenever they are closer than a prescribed distance. By exploring the singularities of such free energies, we show that the large-n limits of the moments of F n are infinitely differentiable functions of p except possibly at values belonging to a certain infinite sequence (p c(k): k ≥ 1) of critical percolation probabilities. It is believed that, in two dimensions, these limiting moments are twice differentiable at these singular values, but not thrice differentiable. This analysis provides a rigorous framework for the numerical experimentation of Dussert, Rasigni, Rasigni, Palmari, and Llebaria, who have proposed novel Monte Carlo methods for estimating the numerical values of critical percolation probabilities.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1023/A:1023092317419

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Central limit theorems for percolation models (1981)

Cox, J. Theodore ; Grimmett, Geoffrey

Springer

Journal of statistical physics 25 (1981), S. 237-251

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ISSN: 1572-9613

Keywords: Percolation ; asymptotic normality ; circuits ; semi-invariants

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract Letp ≠ 1/2 be the open-bond probability in Broadbent and Hammersley's percolation model on the square lattice. LetW x be the cluster of sites connected tox by open paths, and letγ(n) be any sequence of circuits with interiors $$|\mathop \gamma \limits^ \circ (n)| \to \infty $$ . It is shown that for certain sequences of functions {f n }, $$S_n = \sum _{x \in \mathop \gamma \limits^ \circ (n)} f_n (W_x )$$ converges in distribution to the standard normal law when properly normalized. This result answers a problem posed by Kunz and Souillard, proving that the numberS n of sites insideγ(n) which are connected by open paths toγ(n) is approximately normal for large circuitsγ(n).

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01022185

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