| bibtype |
J -
Journal Article
|
| ARLID |
0346287 |
| utime |
20240111140742.4 |
| mtime |
20100906235959.9 |
| WOS |
000280816000003 |
| DOI |
10.1007/s10955-010-0021-x |
| title
(primary) (eng) |
Numerical analysis of the rebellious voter model |
| specification |
|
| serial |
| ARLID |
cav_un_epca*0257115 |
| ISSN |
0022-4715 |
| title
|
Journal of Statistical Physics |
| volume_id |
140 |
| volume |
5 (2010) |
| page_num |
873-899 |
| publisher |
|
|
| keyword |
rebellious voter model |
| keyword |
parity conservation |
| keyword |
exactly solvable model |
| keyword |
coexistence |
| keyword |
interface tightness |
| keyword |
cancellative systems |
| keyword |
Markov chain Monte Carlo |
| author
(primary) |
| ARLID |
cav_un_auth*0217893 |
| name1 |
Swart |
| name2 |
Jan M. |
| full_dept (cz) |
Stochastická informatika |
| full_dept (eng) |
Department of Stochastic Informatics |
| department (cz) |
SI |
| department (eng) |
SI |
| institution |
UTIA-B |
| full_dept |
Department of Stochastic Informatics |
| fullinstit |
Ústav teorie informace a automatizace AV ČR, v. v. i. |
|
| author
|
| ARLID |
cav_un_auth*0101231 |
| name1 |
Vrbenský |
| name2 |
Karel |
| full_dept (cz) |
Stochastická informatika |
| full_dept |
Department of Stochastic Informatics |
| department (cz) |
SI |
| department |
SI |
| institution |
UTIA-B |
| full_dept |
Department of Stochastic Informatics |
| fullinstit |
Ústav teorie informace a automatizace AV ČR, v. v. i. |
|
| source |
|
| cas_special |
| project |
| project_id |
GA201/09/1931 |
| agency |
GA ČR |
| ARLID |
cav_un_auth*0254026 |
|
| project |
| project_id |
1M0572 |
| agency |
GA MŠk |
| ARLID |
cav_un_auth*0001814 |
|
| research |
CEZ:AV0Z10750506 |
| abstract
(eng) |
The rebellious voter model, introduced by Sturm and Swart (2008), is a variation of the standard, one-dimensional voter model, in which types that are locally in the minority have an advantage. It is related, both through duality and through the evolution of its interfaces, to a system of branching annihilating random walks that is believed to belong to the `parity-conservation' universality class. This paper presents numerical data for the rebellious voter model and for a closely related one-sided version of the model. Both models appear to exhibit a phase transition between noncoexistence and coexistence as the advantage for minority types is increased. For the one-sided model (but not for the original, two-sided rebellious voter model), it appears that the critical point is exactly a half and two important functions of the process are given by simple, explicit formulas, a fact for which we have no explanation. |
| reportyear |
2011 |
| RIV |
BA |
| permalink |
http://hdl.handle.net/11104/0187355 |
| mrcbT16-e |
PHYSICSMATHEMATICAL |
| mrcbT16-f |
1.534 |
| mrcbT16-g |
0.34 |
| mrcbT16-h |
>10.0 |
| mrcbT16-i |
0.01824 |
| mrcbT16-j |
0.95 |
| mrcbT16-k |
6908 |
| mrcbT16-l |
206 |
| mrcbT16-s |
1.209 |
| mrcbT16-4 |
Q1 |
| mrcbT16-B |
48.852 |
| mrcbT16-C |
60.185 |
| mrcbT16-D |
Q3 |
| mrcbT16-E |
Q1 |
| arlyear |
2010 |
| mrcbU34 |
000280816000003 WOS |
| mrcbU56 |
1.2 MB |
| mrcbU63 |
cav_un_epca*0257115 Journal of Statistical Physics 0022-4715 1572-9613 Roč. 140 č. 5 2010 873 899 Springer |
|