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
name Springer
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
source_type pdf
url http://library.utia.cas.cz/separaty/2009/SI/swart-the contact process seen from a typical infected site.pdf
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
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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