Asymmetric k-step exclusion process, Non-convex or non-concave flux, microscopic shock, rightmost particle | (1) |
Bernoulli matching model; Discrete TASEP; soft edge; weak law of large numbers; last passage model; increasing paths | (1) |
Duality; graphical representation; Feller's branching diffusion; branching-coalescing particle process; resampling-selection model; stochastic population dynamics | (1) |
Interacting particle systems, catalytic model. | (1) |
RWRP, random walk, random potential, Brownian motion, Poissonian potential, ballistic phase, ballistic limit | (1) |
Más... |
1.
|
The Best Bounds in a Theorem of Russell Lyons Marchal, Philippe; Université Paris 6
|
2.
|
Microscopic structure of a decreasing shock for the asymmetric $k$-step exclusion process Guiol, Herve; IMA-EPFL - Ravishankar, Krishnamurthi; SUNY, College at New Paltz - Saada, Ellen; CNRS Rouen
|
3.
|
Some results for poisoning in a catalytic model Steif, Jeffrey E.; Chalmers University of Technology - Sudbury, Aidan; Monash University
|
4.
|
Density fluctuations for a zero-range process on the percolation cluster Goncalves, Patricia C.; CMAT - U. Minho - Jara, Milton D.; Paris Dauphine
|
5.
|
A limit theorem for particle current in the symmetric exclusion process Vandenberg-Rodes, Alexander; UC Los Angeles
|
6.
|
Graphical representation of some duality relations in stochastic population models Hutzenthaler, Martin; Johann Wolfgang Goethe-Universität Frankfurt, Germany - Alkemper, Roland; Johannes-Gutenberg Universität Mainz, Germany
|
7.
|
A note on the ballistic limit of random motion in a random potential Flury, Markus; University of Tuebingen
|
8.
|
Some two-dimensional finite energy percolation processes Häggström, Olle; Chalmers University of Technology - Mester, Péter; Indiana University
|
9.
|
Soft edge results for longest increasing paths on the planar lattice Georgiou, Nicos; UW-Madison
|