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Line 1: {{Short description\|Vector with non-negative entries that add up to one}} ~~{{Unreferenced\|date=December 2009}}~~ {{redirect\|Stochastic vector\|the concept of a random vector\|Multivariate random variable}} In [[mathematics]] and [[statistics]], a '''probability vector''' or '''stochastic vector''' is a [[vector space\|vector]] with non-negative entries that add up to one. The positions (indices) of a probability vector represent the possible outcomes of a [[discrete random variable]], and the vector gives us the [[probability mass function]] of that random variable, which is the standard way of characterizing a [[discrete probability distribution]].<ref>{{citation \| last = Jacobs \| first = Konrad \| doi = 10.1007/978-3-0348-8645-1 \| isbn = 3-7643-2591-7 \| mr = 1139766 \| page = 45 \| publisher = Birkhäuser Verlag, Basel \| series = Basler Lehrbücher [Basel Textbooks] \| title = Discrete Stochastics \| url = https://books.google.com/books?id=2Rv_i4-01JEC&pg=PA45 \| volume = 3 \| year = 1992}}.</ref> ==Examples== Here are some examples of probability vectors:. The vectors can be either columns or rows. <math> x_0=\begin{bmatrix}0.5 \\ 0.25 \\ 0.25 \end{bmatrix},\;</math> <math> x_1=\begin{bmatrix} 0 \\ 1 \\ 0 \end{bmatrix},\;</math> <math> x_2=\begin{bmatrix} 0.65 \\& 0.35 \end{bmatrix},\;</math> <math> x_3=\begin{bmatrix} 0.3 \\& 0.5 \\& 0.07 \\& 0.1 \\& 0.03 \end{bmatrix}. </math> ==Geometric interpretation== Writing out the vector components of a vector <math>p</math> as :<math>p=\begin{bmatrix} p_1 \\ p_2 \\ \vdots \\ p_n \end{bmatrix}\;quad \text{or} \quad p=\begin{bmatrix} p_1 & p_2 & \cdots & p_n \end{bmatrix}</math> the vector components must sum to one: Line 24 ⟶ 38: :<math>\sum_{i=1}^n p_i = 1</math> ~~One also has the requirement that each~~Each individual component must have a probability between zero and one: :<math>0\le p_i \le 1</math> for all <math>i</math>. ~~These~~Therefore, ~~two~~the ~~requirements~~set ~~show that~~of stochastic vectors ~~have~~coincides ~~a geometric interpretation: A stochastic vector is a point on~~with the ~~"far~~[[Simplex#The ~~face" of a~~standard simplex\|standard ~~orthogonal [[~~<math>(n-1)</math>-simplex]]. ~~That~~It is, a ~~stochastic~~point ~~vector~~if ~~uniquely identifies~~<math>n=1</math>, a ~~point~~segment onif ~~the~~<math>n=2</math>, ~~face~~a ~~opposite~~(filled) oftriangle ~~the~~if ~~orthogonal~~<math>n=3</math>, ~~corner~~a of(filled) ~~the~~[[tetrahedron]] ~~standard~~if ~~simplex.~~<math>n=4</math>, etc. ==Properties== :* The mean of athe ~~probability~~components ~~vector~~of ~~(often referred to as a~~any probability ~~distribution)~~vector is <math> 1/n </math>.▼ :* The shortest probability vector has the value <math> 1/n </math> as each component of the vector, and has a length of <math display="inline">1/\sqrt n</math>.▼ :* The longest probability vector has the value 1 in a single component and 0 in all others, and has a length of 1.▼ :* The shortest vector corresponds to maximum uncertainty, the longest to maximum certainty.▼ :* The length of a probability vector is equal to <math display="inline">\sqrt {n\sigma^2 + 1/n} </math>; where <math> \sigma^2 </math> is the variance of the ~~distribution~~elements of the probability vector.▼ ~~===Some Properties of <math>n</math> dimensional Probability Vectors===~~ ~~: Probability vectors of dimension <math>n</math> are contained within an <math>n</math> dimensional unit [[hypersphere]].~~ ▲: The mean of a probability vector (often referred to as a probability distribution) is <math> 1/n </math>. ▲: The shortest probability vector has the value <math> 1/n </math> as each component of the vector, and has a length of <math>1/\sqrt n</math>. ▲: The longest probability vector has the value 1 in a single component and 0 in all others, and has a length of 1. ▲: The shortest vector corresponds to maximum uncertainty, the longest to maximum certainty. ~~: No two probability vectors in the <math>n</math> dimensional unit hypersphere are collinear unless they are identical.~~ ▲: The length of a probability vector is equal to <math>\sqrt {n\sigma^2 + 1/n} </math>; where <math> \sigma^2 </math> is the variance of the distribution. ==See also== * [[Stochastic matrix]] * [[Dirichlet distribution]] ==References== {{Reflist}} {{DEFAULTSORT:Probability Vector}} [[Category:Probability theory]] [[Category:Vectors (mathematics and physics)]] ~~[[sl:Verjetnostni vektor]]~~ ~~[[sr:Вектор вероватноће]]~~