ID | 11604 |
JaLCDOI | |
Sort Key | 4
|
FullText URL | |
Author |
Hora, Akihito
|
Abstract | Let G be a topological group acting on S transitively from the left with a compact stabilizer K. We show that every isotropic (i.e. spatially homogeneous w.r.t. the G-actions) Markov chain on S can be lifted to a right random walk on G and give a one-to-one correspondence between the isotropic Markov chains on S and the totality of sequences of probabilities (ν,μ1,μ2,・・・) where ν is a probability on G/K and each μn is that on K\G/K.
|
Keywords | random walk
Markov chain
|
Publication Title |
岡山大学環境理工学部研究報告
|
Published Date | 1996-03
|
Volume | volume1
|
Issue | issue1
|
Publisher | 岡山大学環境理工学部
|
Publisher Alternative | Faculty of Environmental Science and Technology, Okayama University
|
Start Page | 21
|
End Page | 26
|
ISSN | 1341-9099
|
NCID | AN10529213
|
Content Type |
Departmental Bulletin Paper
|
OAI-PMH Set |
岡山大学
|
language |
English
|
File Version | publisher
|
NAID | |
Eprints Journal Name | fest
|