doi:10.1007/s00574-013-0036-4Peres, YuvalPopov, SergueiSousi, PerlaMathematicsY. Peres, S. Popov, and P. Sousi, Self-interacting random walks, arXiv:1203.3459v1.Y. Peres, S. Popov and P. Sousi, Self-interacting random walks, arXiv:1203.3459 [math.PR]....
内容提示: Persistence exponents of self-interacting random walksJ. Br´ emont, 1,2 L. R´ egnier, 1 R. Voituriez, 1,2 and O. B´ enichou 11 Laboratoire de Physique Th´ eorique de la Mati` ere Condens´ ee,CNRS/Sorbonne Universit´ e, 4 Place Jussieu, 75005 Paris, ...
Self-Interacting Random Motions 来自 Springer 喜欢 0 阅读量: 54 作者: B Toth 摘要: We present a brief survey of results concerning self-interacting random walks and self-repelling continuous random motions. A self-interacting random walk (SIRW) is a nearest neighbour walk on the one-...
Raimond. A class of non homogeneous self interacting random processes with applications to learning in games and vertex-reinforced random walks. arxiv, 2008... M Benaim,O Raimond - 《Mathematics》 被引量: 3发表: 2008年 Wildland fire as a self-regulating mechanism: the role of previous burns...
Random walks (RWs) have been important in statistical physics and can describe the statistical properties of various processes in physical, chemical, and biological systems. In this study, we have proposed a self-interacting random walk model in a continuous three-dimensional space, wher...
Self-interacting random walksWe use generalized Ray–Knight theorems, introduced by B. Tóth in 1996, together with techniques developed for excited random walks as main tools for establishing positive and negative results concerning convergence of some classes of diffusively scaled self-interacting ...
Ballistic phase of self-interacting random walks. In Analysis and stochastics of growth processes and interface models, pages 55-79. Oxford Univ. Press, Oxford, 2008. [2] Martin P. W. Zerner. Directional decay of the Green's function for a random nonnegative potential on Zd. Ann. Appl. ...
Salisbury. A combinatorial result with applications to self-interacting random walks. Journal of Combinatorial Theory, Series A 119:460-475, 2012M. Holmes and T. S. Salisbury. A combinatorial result with applications to self-interacting random walks. J. Combin. Theory Ser. A, 119(2):460-475...
Sousi. On recurrence and transience of self-interacting random walks. Bulletin of the Brazilian Mathematical Society, New Series, 44(4):841-867, 2013.Y. Peres, S. Popov and P. Sousi. On recurrence and transience of self-interacting random walks. Bulletin of the Brazilian Mathematical Society...
Sousi. On recurrence and transience of self-interacting random walks. Bulletin of the Brazilian Math. Society, 2012. accepted.Y. Peres, S. Popov and P. Sousi. On recurrence and transience of self-interacting random walks. Bulletin of the Brazilian Mathematical Society, (New Series) 44 p. ...