In this note, we combine the two
approaches of Billingsley (1998) and Cs˝org˝o and R´ev´esz (1980),
to provide a detailed sequential and
descriptive for creating a standard Brownian motion, from
a Brownian motion whose time space is
the class of non-negative dyadic numbers following the
interpolation methof of L´evy. By
adding the proof of Etemadi’s inequality to text, it becomes
self-readable and serves as an
independent source for researchers and professors.
Author
(s) Details
Gane Samb
Lo
LERSTAD, Gaston Berger
University, Saint-Louis, Senegal and LSTA, Pierre and Marie Curie University,
Paris VI, France and AUST - African University of Science and Technology,
Abuja, Nigeria.
Aladji
Babacar Niang
LERSTAD, Gaston Berger
University, Saint-Louis, Senegal.
Harouna
Sangare
LERSTAD,
Gaston Berger University, Saint-Louis, Senegal and DER MI, FST, Universite des
Sciences, des Techniques et des Technologies de Bamako (USTT-B), Mali.
View
Book
:-https://bp.bookpi.org/index.php/bpi/catalog/book/237
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