Ce texte présente quelques propriétés de la marche auto-évitante uniforme sur un réseau, ainsi qu’une preuve complète du résultat de Duminil-Copin et Smirnov calculant la constante de connectivité du réseau hexagonal.
@incollection{XUPS_2016____103_0, author = {Vincent Beffara}, title = {La marche auto-\'evitante}, booktitle = {Arbres et marches al\'eatoires}, series = {Journ\'ees math\'ematiques X-UPS}, pages = {103--130}, publisher = {Les \'Editions de l{\textquoteright}\'Ecole polytechnique}, year = {2016}, doi = {10.5802/xups.2016-03}, language = {fr}, url = {https://proceedings.centre-mersenne.org/articles/10.5802/xups.2016-03/} }
TY - JOUR AU - Vincent Beffara TI - La marche auto-évitante JO - Journées mathématiques X-UPS PY - 2016 SP - 103 EP - 130 PB - Les Éditions de l’École polytechnique UR - https://proceedings.centre-mersenne.org/articles/10.5802/xups.2016-03/ DO - 10.5802/xups.2016-03 LA - fr ID - XUPS_2016____103_0 ER -
Vincent Beffara. La marche auto-évitante. Journées mathématiques X-UPS, Arbres et marches aléatoires (2016), pp. 103-130. doi : 10.5802/xups.2016-03. https://proceedings.centre-mersenne.org/articles/10.5802/xups.2016-03/
[1] Roland Bauerschmidt; Hugo Duminil-Copin; Jesse Goodman; Gordon Slade Lectures on self-avoiding walks, Probability and statistical physics in two and more dimensions (Clay Math. Proc.), Volume 15, American Mathematical Society, Providence, RI, 2012, pp. 395-467 | MR | Zbl
[2] Erwin Bolthausen; Remco van der Hofstad; Gady Kozma Lace expansion for dummies, Ann. Inst. Henri Poincaré Probab. Stat., Volume 54 (2018) no. 1, pp. 141-153 | DOI | MR | Zbl
[3] Erwin Bolthausen; Christine Ritzmann A central limit theorem for convolution equations and weakly self-avoiding walks, 2001 | arXiv
[4] David C. Brydges; Thomas Spencer Self-avoiding walk in 5 or more dimensions, Comm. Math. Phys., Volume 97 (1985) no. 1-2, pp. 125-148 | DOI | MR | Zbl
[5] Hugo Duminil-Copin; Alexander Glazman; Alan Hammond; Ioan Manolescu On the probability that self-avoiding walk ends at a given point, Ann. Probability, Volume 44 (2016) no. 2, pp. 955-983 | DOI | MR | Zbl
[6] Hugo Duminil-Copin; Alan Hammond Self-avoiding walk is sub-ballistic, Comm. Math. Phys., Volume 324 (2013) no. 2, pp. 401-423 | DOI | MR | Zbl
[7] Hugo Duminil-Copin; Stanislav Smirnov The connective constant of the honeycomb lattice equals , Ann. of Math. (2), Volume 175 (2010) no. 3, pp. 1653-1665 | DOI | MR | Zbl
[8] J. M. Hammersley; D. J. A. Welsh Further results on the rate of convergence to the connective constant of the hypercubical lattice, Q. J. Math., Volume 13 (1962) no. 1, pp. 108-110 | DOI | MR | Zbl
[9] Takashi Hara; Gordon Slade Self-avoiding walk in five or more dimensions I. The critical behaviour, Comm. Math. Phys., Volume 147 (1992) no. 1, pp. 101-136 | DOI | MR | Zbl
[10] G. H. Hardy; S. Ramanujan Asymptotic formula for the distribution of integers of various types, Proc. London Math. Soc., Volume 16 (1916), pp. 112-132 | DOI | Zbl
[11] Iwan Jensen Enumeration of self-avoiding walks on the square lattice, J. Phys. A, Volume 37 (2004) no. 21, pp. 5503-5524 | DOI | MR | Zbl
[12] Harry Kesten On the number of self-avoiding walks, J. Math. Phys., Volume 4 (1963) no. 7, p. 960 | DOI | MR | Zbl
[13] Harry Kesten On the number of self-avoiding walks. II, J. Math. Phys., Volume 5 (1964) no. 8, p. 1128 | DOI | MR | Zbl
[14] Gregory F Lawler; Oded Schramm; Wendelin Werner On the scaling limit of planar self-avoiding walk, Fractal geometry and applications : a jubilee of Benoît Mandelbrot, Part 2 (Proc. Sympos. Pure Math.), Volume 72, American Mathematical Society, Providence, RI, 2004, pp. 339-364 | DOI | MR | Zbl
[15] Neal Madras; Gordon Slade The self-avoiding walk, Modern Birkhäuser Classics, Birkhäuser/Springer, New York, 2013 (Reprint of the 1993 original) | DOI | MR
[16] Bernard Nienhuis Exact critical point and critical exponents of models in two dimensions, Phys. Rev. Lett., Volume 49 (1982) no. 15, pp. 1062-1065 | DOI | MR
[17] Bernard Nienhuis Critical behavior of two-dimensional spin models and charge asymmetry in the Coulomb gas, J. Statist. Phys., Volume 34 (1984) no. 5-6, pp. 731-761 | DOI | MR | Zbl
[18] George L. O’Brien Monotonicity of the number of self-avoiding walks, J. Statist. Phys., Volume 59 (1990) no. 3-4, pp. 969-979 | DOI | MR | Zbl
[19] Oded Schramm Scaling limits of loop-erased random walks and uniform spanning trees, Israel J. Math., Volume 118 (1999), pp. 221-288 | DOI | MR | Zbl
[20] Gordon Slade The diffusion of self-avoiding random walk in high dimensions, Comm. Math. Phys., Volume 110 (1987) no. 4, pp. 661-683 | DOI | MR | Zbl
Cité par Sources :