bibtype |
J -
Journal Article
|
ARLID |
0327330 |
utime |
20240111140723.8 |
mtime |
20090805235959.9 |
WOS |
000268192300009 |
DOI |
10.1007/s10959-008-0184-4 |
title
(primary) (eng) |
The contact process seen from a typical infected site |
specification |
page_count |
30 s. |
media_type |
www |
|
serial |
ARLID |
cav_un_epca*0254080 |
ISSN |
0894-9840 |
title
|
Journal of Theoretical Probability |
volume_id |
22 |
volume |
3 (2009) |
page_num |
711-740 |
publisher |
|
|
title
(cze) |
Kontaktní proces viděný z typického nakaženého bodu |
keyword |
critical contact process |
keyword |
exponential growth |
keyword |
amenability |
keyword |
Campbell law |
author
(primary) |
ARLID |
cav_un_auth*0217893 |
name1 |
Swart |
name2 |
Jan M. |
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 |
GA201/06/1323 |
agency |
GA ČR |
ARLID |
cav_un_auth*0217370 |
|
research |
CEZ:AV0Z10750506 |
abstract
(eng) |
This paper studies contact processes on general countable groups. It is shown that any such contact process has a well-defined exponential growth rate, and this quantity is used to study the process. In particular, it is proved that on any nonamenable group, the critical contact process dies out. |
abstract
(cze) |
Tento clánek studuje kontakní procesy na libovolných spočetných grupách. Ukazuje se, že každý takový kontaktní proces ma dobře definovanou intensitou exponenciálního růstu, a tato velečina se používá k studiu procesu. Především se ukazuje, že na každé neamenabilní grupě kritický kontaktní proces vymře. |
reportyear |
2010 |
RIV |
BA |
permalink |
http://hdl.handle.net/11104/0174170 |
mrcbT16-f |
0.637 |
mrcbT16-g |
0.269 |
mrcbT16-h |
8.9 |
mrcbT16-i |
0.00332 |
mrcbT16-j |
0.664 |
mrcbT16-k |
499 |
mrcbT16-l |
52 |
arlyear |
2009 |
mrcbU34 |
000268192300009 WOS |
mrcbU56 |
pdf |
mrcbU63 |
cav_un_epca*0254080 Journal of Theoretical Probability 0894-9840 1572-9230 Roč. 22 č. 3 2009 711 740 Springer |
|