Standard
Every approximately transitive amenable action of a locally compact group is a Poisson boundary. / Elliott, George Arthur; Giordano, Thierry.
I:
Mathematical Reports of the Academy of Science, The Royal Society of Canada, Bind 21, 1998, s. 9-15.
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Harvard
Elliott, GA & Giordano, T 1998, 'Every approximately transitive amenable action of a locally compact group is a Poisson boundary', Mathematical Reports of the Academy of Science, The Royal Society of Canada, bind 21, s. 9-15.
APA
Elliott, G. A., & Giordano, T. (1998). Every approximately transitive amenable action of a locally compact group is a Poisson boundary. Mathematical Reports of the Academy of Science, The Royal Society of Canada, 21, 9-15.
Vancouver
Elliott GA, Giordano T. Every approximately transitive amenable action of a locally compact group is a Poisson boundary. Mathematical Reports of the Academy of Science, The Royal Society of Canada. 1998;21:9-15.
Author
Elliott, George Arthur ; Giordano, Thierry. / Every approximately transitive amenable action of a locally compact group is a Poisson boundary. I: Mathematical Reports of the Academy of Science, The Royal Society of Canada. 1998 ; Bind 21. s. 9-15.
Bibtex
@article{9f53ebc074c811dbbee902004c4f4f50,
title = "Every approximately transitive amenable action of a locally compact group is a Poisson boundary",
abstract = "matematik, ergodic theory, von Neumann algebra",
author = "Elliott, {George Arthur} and Thierry Giordano",
year = "1998",
language = "English",
volume = "21",
pages = "9--15",
journal = "Mathematical Reports of the Academy of Science, The Royal Society of Canada",
}
RIS
TY - JOUR
T1 - Every approximately transitive amenable action of a locally compact group is a Poisson boundary
AU - Elliott, George Arthur
AU - Giordano, Thierry
PY - 1998
Y1 - 1998
N2 - matematik, ergodic theory, von Neumann algebra
AB - matematik, ergodic theory, von Neumann algebra
M3 - Journal article
VL - 21
SP - 9
EP - 15
JO - Mathematical Reports of the Academy of Science, The Royal Society of Canada
JF - Mathematical Reports of the Academy of Science, The Royal Society of Canada
ER -