| Contents |
| 1-8 |
Introduction |
| |
Cyril Banderier and Christian Krattenthaler |
| 9-16 |
Random walks with cyclic time and random infinite permutations |
| |
Omer Angel |
| 17-26
|
A phase transition in the random transposition random walk
|
|
|
Nathanael Berestycki and Richard Durrett
|
| 27-38
|
Some results for directed lattice walkers in a strip
|
|
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Yao-ban Chan and Anthony J. Guttmann
|
|
| 39-44
|
The Speed of Simple Random Walk and Anchored Expansion in Percolation Clusters: an Overview
|
|
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Dayue Chen and Yuval Peres
|
| 45-52
|
Lengths and heights of random walk excursions
|
|
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Endre Csáki and Yueyun Hu
|
| 53-68
|
Approximation and Analytical Studies of Inter-clustering Performances of Space-Filling Curves
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H. K. Dai and H. C. Su
|
| 69-82
|
Joint Burke's Theorem and RSK Representation for a Queue and a Store
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Moez Draief, Jean Mairesse, and Neil O'Connell
|
| 83-94
|
Discrete random walks on one-sided periodic graphs
|
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Michael Drmota
|
| 95-104
|
Rigorous result for the CHKNS random graph model
|
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Richard Durrett
|
| 105-112
|
Entropic repulsion on a rarefied wall
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Luiz Renato G. Fontes, Marina Vachkovskaia, and Anatoli Yambartsev
|
| 113-126
|
Linear Phase Transition in Random Linear Constraint Satisfaction Problems
|
|
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David Gamarnik
|
| 127-136
|
Transient probability functions- a sample path approach
|
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Michael L. Green, Alan Krinik, Carrie Mortensen, Gerardo Rubino, and Randall Swift
|
| 137-144
|
Some remarks on harmonic functions on homogeneous infinite graphs
|
|
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Anders Karlsson
|
| 145-154
|
Rooted Trees and Moments of Large Random Matrices
|
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Oleksiy Khorunzhy
|
| 155-170 |
The number of distinct part sizes of some multiplicity in compositions of an integer. An asymptotic analysis |
| |
Guy Louchard |
| 171-172 |
Percolation on a non-homogeneous Poisson blob process |
| |
Fabio Machado |
| 173-180 |
Annihilating random walks and perfect matchings of planar graphs |
| |
Massimiliano Mattera |
| 181-190 |
Constructing a sequence of random walks strongly converging to Brownian motion |
| |
Philippe Marchal |
| 191-204 |
Reconstruction Thresholds on Regular Trees |
| |
James B. Martin |
| 205-216 |
Bindweeds or random walks in random environments on multiplexed trees and their asympotics |
| |
Mikhail Menshikov, Dimitri Petritis, and Serguei Popov |
| 217-228 |
Generating functions for the area below some lattice paths |
| |
Donatella Merlini |
| 229-242 |
Area of Brownian Motion with Generatingfunctionology |
| |
Michel Nguyên Thê |
| 243-258 |
q
-gram analysis and urn models |
| |
Pierre Nicodème |
| 259-264 |
Osculating Random Walks on Cylinders |
| |
Saibal Mitra and Bernard Nienhuis |
| 265-276 |
Non-crossing trees revisited: cutting down and spanning subtrees |
| |
Alois Panholzer |
| 277-288 |
Frogs and some other interacting random walks models |
| |
Serguei Popov |
| 289-300 |
A Random Walk Approach for Light Scattering in Material |
| |
Klaus Simon and Beat Trachsler |
| 301-308 |
The volume and time comparison principle and transition probability estimates for random walks |
| |
Andras Telcs |
| 309-324 |
Asymptotics of the distribution of the integral of the absolute value of the Brownian motion for large arguments |
| |
Leonid Tolmatz |
| 325-332 |
Individuals at the origin in the critical catalytic branching random walk |
| |
Valentin Topchii and Vladimir Vatutin |
| 333-344 |
Average properties of combinatorial problems and thermodynamics of spin models on graph |
| |
Alessandro Vezzani, Davide Cassi, Raffaella Burioni |
| 345-358 |
Non Uniform Random Walks |
| |
Nisheeth Vishnoi |
