Abstract
This document gathers a set of conferences presented in 1962. A first one proposes a mathematical introduction to the analysis of random phenomena. The second one presents an axiomatic of probability calculation. The third one proposes an overview of one-dimensional random variables. The fourth one addresses random pairs, and presents basic theorems regarding the algebra of mathematical expectations. The fifth conference discusses some probability laws: binomial distribution, the Poisson distribution, and the Laplace-Gauss distribution. The last one deals with the issues of stochastic convergence and asymptotic distributions.
Bonnet, G.
[1]
- Commissariat a l'energie atomique et aux energies alternatives - CEA, C.E.N.G., Service d'Electronique, Section d'Electronique, Grenoble (France)
Citation Formats
Bonnet, G.
Random phenomena; Phenomenes aleatoires.
France: N. p.,
1963.
Web.
Bonnet, G.
Random phenomena; Phenomenes aleatoires.
France.
Bonnet, G.
1963.
"Random phenomena; Phenomenes aleatoires."
France.
@misc{etde_22692285,
title = {Random phenomena; Phenomenes aleatoires}
author = {Bonnet, G.}
abstractNote = {This document gathers a set of conferences presented in 1962. A first one proposes a mathematical introduction to the analysis of random phenomena. The second one presents an axiomatic of probability calculation. The third one proposes an overview of one-dimensional random variables. The fourth one addresses random pairs, and presents basic theorems regarding the algebra of mathematical expectations. The fifth conference discusses some probability laws: binomial distribution, the Poisson distribution, and the Laplace-Gauss distribution. The last one deals with the issues of stochastic convergence and asymptotic distributions.}
place = {France}
year = {1963}
month = {Jul}
}
title = {Random phenomena; Phenomenes aleatoires}
author = {Bonnet, G.}
abstractNote = {This document gathers a set of conferences presented in 1962. A first one proposes a mathematical introduction to the analysis of random phenomena. The second one presents an axiomatic of probability calculation. The third one proposes an overview of one-dimensional random variables. The fourth one addresses random pairs, and presents basic theorems regarding the algebra of mathematical expectations. The fifth conference discusses some probability laws: binomial distribution, the Poisson distribution, and the Laplace-Gauss distribution. The last one deals with the issues of stochastic convergence and asymptotic distributions.}
place = {France}
year = {1963}
month = {Jul}
}