Random n -ary sequence and mapping uniformly distributed

Nguyen Van Ho; Nguyen Thi Hoa

Applications of Mathematics (1995)

  • Volume: 40, Issue: 1, page 33-46
  • ISSN: 0862-7940

Abstract

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Višek [3] and Culpin [1] investigated infinite binary sequence X = ( X 1 , X 2 , ) with X i taking values 0 or 1 at random. They investigated also real mappings H ( X ) which have the uniform distribution on [ 0 ; 1 ] (notation 𝒰 ( 0 ; 1 ) ). The problem for n -ary sequences is dealt with in this paper.

How to cite

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Ho, Nguyen Van, and Hoa, Nguyen Thi. "Random $n$-ary sequence and mapping uniformly distributed." Applications of Mathematics 40.1 (1995): 33-46. <http://eudml.org/doc/32901>.

@article{Ho1995,
abstract = {Višek [3] and Culpin [1] investigated infinite binary sequence $X=(X_1,X_2,\dots )$ with $X_i$ taking values $0$ or $1$ at random. They investigated also real mappings $H(X)$ which have the uniform distribution on $[0;1]$ (notation $\mathcal \{U\}(0;1)$). The problem for $n$-ary sequences is dealt with in this paper.},
author = {Ho, Nguyen Van, Hoa, Nguyen Thi},
journal = {Applications of Mathematics},
keywords = {random $n$-ary sequences; uniform distribution; uniform distribution; transformation of random variable; binary sequences; Markov chains},
language = {eng},
number = {1},
pages = {33-46},
publisher = {Institute of Mathematics, Academy of Sciences of the Czech Republic},
title = {Random $n$-ary sequence and mapping uniformly distributed},
url = {http://eudml.org/doc/32901},
volume = {40},
year = {1995},
}

TY - JOUR
AU - Ho, Nguyen Van
AU - Hoa, Nguyen Thi
TI - Random $n$-ary sequence and mapping uniformly distributed
JO - Applications of Mathematics
PY - 1995
PB - Institute of Mathematics, Academy of Sciences of the Czech Republic
VL - 40
IS - 1
SP - 33
EP - 46
AB - Višek [3] and Culpin [1] investigated infinite binary sequence $X=(X_1,X_2,\dots )$ with $X_i$ taking values $0$ or $1$ at random. They investigated also real mappings $H(X)$ which have the uniform distribution on $[0;1]$ (notation $\mathcal {U}(0;1)$). The problem for $n$-ary sequences is dealt with in this paper.
LA - eng
KW - random $n$-ary sequences; uniform distribution; uniform distribution; transformation of random variable; binary sequences; Markov chains
UR - http://eudml.org/doc/32901
ER -

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