Gibbs Ensembles of Nonintersecting Paths, http://arxiv.org/abs/0804.0564, Communications in Mathematical Physics, Volume 293, Number 1 / January, 2010 Перейти к публикации
2009 г.
Авторы: Bellissard, Charles Radin Jean, Shlosman S.
The characterization of ground states, http://arxiv.org/abs/0907.5393. Перейти к публикации
Spontaneous resonances and the coherent states of the queuing networks// Proc. of Dobrushin International Conference, Moscow. July 2009. ИППИ РАН, С. 149-156.
Rybko, A. N.; Shlosman, S.B.: Phase transitions in the queuing networks and the violation of the Poisson hypothesis. Mosc. Math. J. 8 (2008), no. 1, 159--180.
Ioffe, D. and Shlosman, S.: Ising model fog drip: the first two droplets, In: "In and Out of Equilibrium 2", Progress in Probability 60, 365-382, eds. M.E. Vares, V. Sidoravicius, Birkhauser, 2008.
Rybko, A. N.; Shlosman, S.B. and Vladimirov A.: Spontaneous Resonances and the Coherent States of the Queuing Networks, J. Stat Phys (2008) 134: 67--104.
Absence of Breakdown of the Poisson Hypothesis I. Closed Networks at Low Load, 2008 http://arxiv.org/abs/0811.3577, submitted to Queueing Systems. Перейти к публикации
Spontaneous resonances and the coherent states of the queuing networks//Abs. of Symphosium on Perspectives in Modeling and Performance of Computer Systems "Model35", INRIA, Paris-Rocquencourt. April 2008. P. 13.
Absence of breakdown of the Poisson hypothesis. I Closed networks at low load // http://arxiv.org/PS-cache/arxiv/math/pdf/0811/0811.3577 v.1pdf. 2008. P. 1-18.
A.C.D. van Enter, S.B.Shlosman: First-order transitions for very nonlinear sigma models. John Lewis memorial volume: Markov Processes Relat. Fields 13, 239--249 (2007)
Rybko, A. N.; Shlosman, S.B. and Vladimirov A. Self-averaging property of queuing systems, http://fr.arxiv.org/abs/math.PR/0510046, Problems of Information Transmission, 42 , Issue 4 (December 2006) Pages: 344 - 355.
A.C.D. van Enter, S.B.Shlosman: Provable first-order transitions for liquid crystal and lattice gauge models with continuous symmetries, http://fr.arxiv.org/pdf/cond-mat/0306362, Communications in Math. Physics, v. 255, n. 1, pp. 21 - 32, 2005.
Thierry Bodineau, Roberto H. Schonmann, Senya Shlosman. 3D crystal: how flat its flat facets are? http://fr.arxiv.org/pdf/math-ph/0401010, Communications in Math. Physics. v. 255, n. 3, pp. 747 - 766, 2005.
Blanchard Ph., Gandolfo D., Ruiz J., Shlosman S. On the Euler-Poincare Characteristic of the Random Cluster Model, Markov Processes and Related Fields, v. 9, # 4, pp. 523-545, 2003
S. Shlosman: Applications of the Wulff construction to the number theory, arXiv.org e-Print archive, math-ph/0109027, "Representation Theory, Dynamical Systems, Combinatorial and Algorithmic Methods. Part 7" (A.M.Vershik ed.). Zapiski Nauchnyh Seminarov POMI, vol. 292, 2002, Pages 153-160, http://www.pdmi.ras.ru/znsl/2002/v292.html.
D. Ioffe, S. Shlosman, and Y. Velenik: 2D models of statistical physics with continuous symmetry: the case of singular interactions, Comm. Math. Phys., 226, 433-454, 2002.
A.C.D. van Enter, S.B.Shlosman: First-order transitions for n-vector models in two and more dimensions; rigorous proof, http://www.ma.utexas.edu/mp_arc/e/02-236.latex.mime, Phys. Rev. Lett. 89, # 28, 285702, 2002.
S. Shlosman and M. Tsfasman: Random Lattices and Random Sphere Packings: Typical Properties, arXiv.org e-Print archive, math-ph/0011040, Moscow Math. Journal, 1, 73-89, 2001.
S. Shlosman: The Wulff construction in statistical mechanics and in combinatorics, arXiv.org e-Print archive, math-ph/0010039, Успехи математических наук, 2001, 56 (4), 709-738.
P. Bleher, J. Ruiz , R.H. Schonmann, S. Shlosman and V. Zagrebnov: Rigidity of the critical phases on a Cayley tree, http://rene.ma.utexas.edu/mp_arc/, # 00-418, Moscow Math. Journal, 1, no. 3, 345-364, 2001.
S. Shlosman: Geometric variational problems of statistical mechanics and of combinatorics, Probabilistic techniques in equilibrium and nonequilibrium statistical physics. J. Math. Phys. 41, 1364--1370, 2000.
S. Shlosman: Path Large Deviation and Other Typical Properties of the Low-Temperature Models, with Applications to the Weakly Gibbs States, Markov Processes and Related Fields, 6, 121- 134, 2000.