# The Definition of Finite Sequences and Matrices of Probability, and Addition of Matrices of Real Elements

Formalized Mathematics (2006)

- Volume: 14, Issue: 3, page 101-108
- ISSN: 1426-2630

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topBo Zhang, and Yatsuka Nakamura. "The Definition of Finite Sequences and Matrices of Probability, and Addition of Matrices of Real Elements." Formalized Mathematics 14.3 (2006): 101-108. <http://eudml.org/doc/266841>.

@article{BoZhang2006,

abstract = {In this article, we first define finite sequences of probability distribution and matrices of joint probability and conditional probability. We discuss also the concept of marginal probability. Further, we describe some theorems of matrices of real elements including quadratic form.},

author = {Bo Zhang, Yatsuka Nakamura},

journal = {Formalized Mathematics},

language = {eng},

number = {3},

pages = {101-108},

title = {The Definition of Finite Sequences and Matrices of Probability, and Addition of Matrices of Real Elements},

url = {http://eudml.org/doc/266841},

volume = {14},

year = {2006},

}

TY - JOUR

AU - Bo Zhang

AU - Yatsuka Nakamura

TI - The Definition of Finite Sequences and Matrices of Probability, and Addition of Matrices of Real Elements

JO - Formalized Mathematics

PY - 2006

VL - 14

IS - 3

SP - 101

EP - 108

AB - In this article, we first define finite sequences of probability distribution and matrices of joint probability and conditional probability. We discuss also the concept of marginal probability. Further, we describe some theorems of matrices of real elements including quadratic form.

LA - eng

UR - http://eudml.org/doc/266841

ER -

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## Citations in EuDML Documents

top- Bo Zhang, Yatsuka Nakamura, Definition and some Properties of Information Entropy
- Hiroyuki Okazaki, Probability on Finite and Discrete Set and Uniform Distribution
- Nobuyuki Tamura, Yatsuka Nakamura, Determinant and Inverse of Matrices of Real Elements
- Hiroyuki Okazaki, Posterior Probability on Finite Set
- Noboru Endou, Double Series and Sums
- Karol Pąk, Euler’s Partition Theorem