Loss Network Representation of Peierls Contours
Roberto Fernández, Pablo A. Ferrari, and Nancy L. Garcia
Source: Ann. Probab. Volume 29, Number 2
(2001), 902-937.
Abstract
We present a probabilistic approach for the study of systems with exclusions in the regime traditionally studied via cluster-expansion methods. In this paper we focus on its application for the gases of Peierls contours found in the study of the Ising model at low temperatures, but most of the results are general. We realize the equilibrium measure as the invariant measure of a loss network process whose existence is ensured by a subcriticality condition of a dominant branching process. In this regime the approach yields, besides existence and uniqueness of the measure, properties such as exponential space convergence and mixing, and a central limit theorem. The loss network converges exponentially fast to the equilibrium measure, without metastable traps. This convergence is faster at low temperatures, where it leads to the proof of an asymptotic Poisson distribution of contours. Our results on the mixing properties of the measure are comparable to those obtained with “duplicated-variables expansion,” used to treat systems with disorder and coupled map lattices. It works in a larger region of validity than usual cluster-expansion formalisms, and it is not tied to the analyticity of the pressure. In fact, it does not lead to any kind of expansion for the latter, and the properties of the equilibrium measure are obtained without resorting to combinatorial or complex analysis techniques.
First Page:
Show
Hide
Keywords: Peierls contours; animal models; loss networks; Ising model; oriented percolation; central limit theorem; Poisson approximation
Full-text: Open access
Links and Identifiers
Permanent link to this document: http://projecteuclid.org/euclid.aop/1008956697
Digital Object Identifier: doi:10.1214/aop/1008956697
Mathematical Reviews number (MathSciNet): MR1849182
Zentralblatt MATH identifier: 1015.60090
References
Athreya, K. B. and Ney, P. E. (1972). Branching Processes. Springer, New York.
Mathematical Reviews (MathSciNet): MR51:9242
Baddeley, A. J. and van Lieshout, M. N. M. (1995). Area-interaction point processes. Ann. Inst. Statist. Math. 47 601-619.
Mathematical Reviews (MathSciNet): MR97j:62143
Zentralblatt MATH: 0848.60051
Digital Object Identifier: doi:10.1007/BF01856536
Bolthausen, E. (1982). On the central limit theorem for stationary mixing random fields. Ann. Probab. 10 1047-1050.
Mathematical Reviews (MathSciNet): MR84c:60035
Zentralblatt MATH: 0496.60020
Digital Object Identifier: doi:10.1214/aop/1176993726
Project Euclid: euclid.aop/1176993726
Borgs, C. and Imbrie, J.(1989). A unified approach to phase diagrams in field theory and statistical mechanics. Comm. Math. Phys. 123 305-328.
Mathematical Reviews (MathSciNet): MR90k:82023
Zentralblatt MATH: 0668.60092
Digital Object Identifier: doi:10.1007/BF01238860
Project Euclid: euclid.cmp/1104178765
Bricmont, J. and Kupiainen, A. (1996). High temperature expansions and dynamical systems. Comm. Math. Phys. 178 703-732.
Mathematical Reviews (MathSciNet): MR97c:82011
Zentralblatt MATH: 0859.58037
Digital Object Identifier: doi:10.1007/BF02108821
Project Euclid: euclid.cmp/1104286772
Bricmont, J. and Kupiainen, A. (1997). Infinite-dimensional SRB measures: lattice dynamics. Phys. D 103 18-33.
Mathematical Reviews (MathSciNet): MR98i:82040
Digital Object Identifier: doi:10.1016/S0167-2789(96)00250-3
Brockmeyer, E., Halstrøm, H. L. and Jensen, A. (1948). The life and works of A. K. Erlang. Trans. Danish Acad. Tech. Sci.; second, unaltered, edition in Acta Polytech. Scand. 287
Mathematical Reviews (MathSciNet): MR10,385c
(1960).
Brydges, D. C. (1984). A short cluster in cluster expansions. In Critical Phenomena, Random Systems, Gauge Theories (K. Osterwalder and R. Stora, eds.) 129-183. North-Holland, Amsterdam.
Mathematical Reviews (MathSciNet): MR880525
Zentralblatt MATH: 0659.60136
Dobrushin, R. L. (1965). Existence of a phase transition in the two-dimensional and threedimensional Ising models. Theory Probab. Appl. 10 193-213. [Russian original: Soviet Phys. Dok. 10 111-113.] Dobrushin, R. L. (1996a). Estimates of semiinvariants for the Ising model at low temperatures. Topics in Statistics and Theoretical Physics. Amer. Math. Soc. Transl. Ser. 2 177 59-81. Dobrushin, R. L. (1996b). Perturbation methods of the theory of Gibbsian fields. ´Ecole d' ´Et´e de Probabilit´es de Saint-Flour XXIV. Lecture Notes in Math. 1648 1-66. Springer, New York.
Mathematical Reviews (MathSciNet): MR31:6628
von Dreifus, H., Klein, A. and Perez, J. F. (1995). Taming Griffiths' singularities: infinite differentiability of quenched correlation functions. Comm. Math. Phys. 170 21-39.
Mathematical Reviews (MathSciNet): MR96g:82014
Zentralblatt MATH: 0820.60086
Digital Object Identifier: doi:10.1007/BF02099437
Project Euclid: euclid.cmp/1104272947
Durrett, R. (1995). Ten lectures on particle systems. Lectures on Probability Theory 97-201. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR97c:60236
Zentralblatt MATH: 0840.60088
Fern´andez, R., Ferrari, P. A. and Garcia, N. (1998). Measures on contour, polymer or animal models: a probabilistic approach. Markov Process. Related Fields 4 479-497.
Fern´andez, R., Ferrari, P. A. and Garcia, N. (1999). Perfect simulation of fixed-routing loss networks: application to the low-temperature Ising model. Unpublished manuscript.
Ferrari, P. A. and Garcia, N. (1998). One-dimensional loss networks and conditioned M/G/ queues. J. Appl. Probab. 35 963-975.
Mathematical Reviews (MathSciNet): MR2000m:60107
Zentralblatt MATH: 0934.60014
Digital Object Identifier: doi:10.1239/jap/1032438391
Project Euclid: euclid.jap/1032438391
Griffiths, R. B. (1964). Peierls' proof of spontaneous magnetization in a two dimensional Ising ferromagnet. Phys. Rev. A 136 437-439.
Mathematical Reviews (MathSciNet): MR32:7103
Hall, P. (1985). On continuum percolation. Ann. Probab. 13 1250-1266.
Zentralblatt MATH: 0588.60096
Mathematical Reviews (MathSciNet): MR806222
Digital Object Identifier: doi:10.1214/aop/1176992809
Project Euclid: euclid.aop/1176992809
Hall, P. (1988). Introduction to the Theory of Coverage Processes. Wiley, New York.
Mathematical Reviews (MathSciNet): MR973404
Zentralblatt MATH: 0659.60024
Harris, T. E. (1963). The theory of branching processes. Grundlehren Math. Wiss. 119.
Mathematical Reviews (MathSciNet): MR163361
Harris, T. E. (1972). Nearest-neighbor Markov interaction processes on multidimensional lattices. Adv. in Math. 9 66-89.
Zentralblatt MATH: 0267.60107
Mathematical Reviews (MathSciNet): MR307392
Digital Object Identifier: doi:10.1016/0001-8708(72)90030-8
Kelly, F. P. (1991). Loss networks. Ann. Appl. Probab. 1 319-378.
Zentralblatt MATH: 0743.60099
Mathematical Reviews (MathSciNet): MR1111523
Digital Object Identifier: doi:10.1214/aoap/1177005872
Project Euclid: euclid.aoap/1177005872
Kendall, W. S. (1997). On some weighted Boolean models. In Proceedings of the International Symposium on Advances in Theory and Applications of Random Sets 105-120. World Scientific, River Edge, NJ.
Mathematical Reviews (MathSciNet): MR1654418
Kendall, W. S. (1998). Perfect simulation for the area-interaction point process. In Probability Towards 2000 218-234. Springer, New York.
Mathematical Reviews (MathSciNet): MR99e:62144
Zentralblatt MATH: 1045.60503
Koteck´y, R. and Preiss, D. (1986). Cluster expansion for abstract polymer models. Comm. Math. Phys. 103 491-498.
Mathematical Reviews (MathSciNet): MR87f:82007
Digital Object Identifier: doi:10.1007/BF01211762
Project Euclid: euclid.cmp/1104114796
Liggett, T. M. (1985). Interacting Particle Systems. Springer, New York.
Mathematical Reviews (MathSciNet): MR86e:60089
Liggett, T. M. (1995). Improved upper bounds for the contact process critical value. Ann. Probab. 23 697-723.
Mathematical Reviews (MathSciNet): MR96d:60157
Zentralblatt MATH: 0832.60093
Digital Object Identifier: doi:10.1214/aop/1176988285
Project Euclid: euclid.aop/1176988285
Malyshev, V. A. (1980). Cluster expansions in lattice models of statistical physics and quantum theory of fields. Russian Math. Surveys 35 1-62.
Mathematical Reviews (MathSciNet): MR571645
Neveu, J. (1977). Processus ponctuels. In ´Ecole d' ´Et´e de Probabilit´es de Saint-Flour VI. Lecture Notes in Math. 598. 249-445. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR57:14132
Peierls, R. (1936). On Ising's model of ferromagnetism. Math. Proc. Cambridge Philos. Soc. 32 477-481.
Zentralblatt MATH: 0014.33604
Seiler, E. (1982). Gauge Theories as a Problem of Constructive Quantum Field Theory and Statistical Mechanics. Lecture Notes in Phys. 159. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR86g:81084
Zahradn´ik, E. (1984). An alternate version of Pirogov-Sinai theory. Comm. Math. Phys. 93 559-5581.
Mathematical Reviews (MathSciNet): MR86k:82039
Digital Object Identifier: doi:10.1007/BF01212295
Project Euclid: euclid.cmp/1103941183
IMECC, UNICAMP Caixa Postal 6065 13081-970 Campinas SP Brazil E-mail: nancy@ime.unicamp.br
The Annals of Probability
