Notation in probability and statistics

Probability theory and statistics have some commonly used conventions, in addition to standard mathematical notation and mathematical symbols.

Probability theory[edit]

Random variables are usually written in upper case Roman letters: ${\textstyle X}$ , ${\textstyle Y}$ , etc.
Particular realizations of a random variable are written in corresponding lower case letters. For example, ${\textstyle x_{1},x_{2},\ldots ,x_{n}}$ could be a sample corresponding to the random variable ${\textstyle X}$ . A cumulative probability is formally written $P(X\leq x)$ to differentiate the random variable from its realization.^[1]
The probability is sometimes written $\mathbb {P}$ to distinguish it from other functions and measure P to avoid having to define "P is a probability" and $\mathbb {P} (X\in A)$ is short for $P(\{\omega \in \Omega :X(\omega )\in A\})$ , where $\Omega$ is the event space and $X(\omega )$ is a random variable. $\Pr(A)$ notation is used alternatively.
$\mathbb {P} (A\cap B)$ or $\mathbb {P} [B\cap A]$ indicates the probability that events A and B both occur. The joint probability distribution of random variables X and Y is denoted as $P(X,Y)$ , while joint probability mass function or probability density function as $f(x,y)$ and joint cumulative distribution function as $F(x,y)$ .
$\mathbb {P} (A\cup B)$ or $\mathbb {P} [B\cup A]$ indicates the probability of either event A or event B occurring ("or" in this case means one or the other or both).
σ-algebras are usually written with uppercase calligraphic (e.g. ${\mathcal {F}}$ for the set of sets on which we define the probability P)
Probability density functions (pdfs) and probability mass functions are denoted by lowercase letters, e.g. $f(x)$ , or $f_{X}(x)$ .
Cumulative distribution functions (cdfs) are denoted by uppercase letters, e.g. $F(x)$ , or $F_{X}(x)$ .
Survival functions or complementary cumulative distribution functions are often denoted by placing an overbar over the symbol for the cumulative: ${\overline {F}}(x)=1-F(x)$ , or denoted as $S(x)$ ,
In particular, the pdf of the standard normal distribution is denoted by ${\textstyle \varphi (z)}$ , and its cdf by ${\textstyle \Phi (z)}$ .
Some common operators:

${\textstyle \mathrm {E} [X]}$ : expected value of X
${\textstyle \operatorname {var} [X]}$ : variance of X
${\textstyle \operatorname {cov} [X,Y]}$ : covariance of X and Y

X is independent of Y is often written $X\perp Y$ or $X\perp \!\!\!\perp Y$ , and X is independent of Y given W is often written

X\perp \!\!\!\perp Y\,|\,W

or

X\perp Y\,|\,W

$\textstyle P(A\mid B)$ , the conditional probability, is the probability of $\textstyle A$ given $\textstyle B$ ^[2]

Statistics[edit]

Greek letters (e.g. θ, β) are commonly used to denote unknown parameters (population parameters).^[3]
A tilde (~) denotes "has the probability distribution of".
Placing a hat, or caret (also known as a circumflex), over a true parameter denotes an estimator of it, e.g., ${\widehat {\theta }}$ is an estimator for $\theta$ .
The arithmetic mean of a series of values ${\textstyle x_{1},x_{2},\ldots ,x_{n}}$ is often denoted by placing an "overbar" over the symbol, e.g. ${\bar {x}}$ , pronounced " ${\textstyle x}$ bar".
Some commonly used symbols for sample statistics are given below:
- the sample mean ${\bar {x}}$ ,
- the sample variance ${\textstyle s^{2}}$ ,
- the sample standard deviation ${\textstyle s}$ ,
- the sample correlation coefficient ${\textstyle r}$ ,
- the sample cumulants ${\textstyle k_{r}}$ .
Some commonly used symbols for population parameters are given below:
- the population mean ${\textstyle \mu }$ ,
- the population variance ${\textstyle \sigma ^{2}}$ ,
- the population standard deviation ${\textstyle \sigma }$ ,
- the population correlation ${\textstyle \rho }$ ,
- the population cumulants ${\textstyle \kappa _{r}}$ ,
$x_{(k)}$ is used for the $k^{\text{th}}$ order statistic, where $x_{(1)}$ is the sample minimum and $x_{(n)}$ is the sample maximum from a total sample size ${\textstyle n}$ .^[4]

Critical values[edit]

The α-level upper critical value of a probability distribution is the value exceeded with probability ${\textstyle \alpha }$ , that is, the value ${\textstyle x_{\alpha }}$ such that ${\textstyle F(x_{\alpha })=1-\alpha }$ , where ${\textstyle F}$ is the cumulative distribution function. There are standard notations for the upper critical values of some commonly used distributions in statistics:

${\textstyle z_{\alpha }}$ or ${\textstyle z(\alpha )}$ for the standard normal distribution
${\textstyle t_{\alpha ,\nu }}$ or ${\textstyle t(\alpha ,\nu )}$ for the t-distribution with ${\textstyle \nu }$ degrees of freedom
${\chi _{\alpha ,\nu }}^{2}$ or ${\chi }^{2}(\alpha ,\nu )$ for the chi-squared distribution with ${\textstyle \nu }$ degrees of freedom
$F_{\alpha ,\nu _{1},\nu _{2}}$ or ${\textstyle F(\alpha ,\nu _{1},\nu _{2})}$ for the F-distribution with ${\textstyle \nu _{1}}$ and ${\textstyle \nu _{2}}$ degrees of freedom

Linear algebra[edit]

Matrices are usually denoted by boldface capital letters, e.g. ${\textstyle {\mathbf {A}}}$ .
Column vectors are usually denoted by boldface lowercase letters, e.g. ${\textstyle {\mathbf {x}}}$ .
The transpose operator is denoted by either a superscript T (e.g. ${\textstyle {\mathbf {A}}^{\mathrm {T} }}$ ) or a prime symbol (e.g. ${\textstyle {\mathbf {A}}'}$ ).
A row vector is written as the transpose of a column vector, e.g. ${\textstyle {\mathbf {x}}^{\mathrm {T} }}$ or ${\textstyle {\mathbf {x}}'}$ .

Abbreviations[edit]

Common abbreviations include:

a.e. almost everywhere
a.s. almost surely
cdf cumulative distribution function
cmf cumulative mass function
df degrees of freedom (also $\nu$ )
i.i.d. independent and identically distributed
pdf probability density function
pmf probability mass function
r.v. random variable
w.p. with probability; wp1 with probability 1
i.o. infinitely often, i.e. $\{A_{n}{\text{ i.o.}}\}=\bigcap _{N}\bigcup _{n\geq N}A_{n}$
ult. ultimately, i.e. $\{A_{n}{\text{ ult.}}\}=\bigcup _{N}\bigcap _{n\geq N}A_{n}$

References[edit]

^ "Calculating Probabilities from Cumulative Distribution Function". 2021-08-09. Retrieved 2024-02-26.
^ "Probability and stochastic processes", Applied Stochastic Processes, Chapman and Hall/CRC, pp. 9–36, 2013-07-22, ISBN 978-0-429-16812-3, retrieved 2023-12-08
^ "Letters of the Greek Alphabet and Some of Their Statistical Uses". les.appstate.edu/. 1999-02-13. Retrieved 2024-02-26.
^ "Order Statistics" (PDF). colorado.edu. Retrieved 2024-02-26.

Halperin, Max; Hartley, H. O.; Hoel, P. G. (1965), "Recommended Standards for Statistical Symbols and Notation. COPSS Committee on Symbols and Notation", The American Statistician, 19 (3): 12–14, doi:10.2307/2681417, JSTOR 2681417

External links[edit]

Earliest Uses of Symbols in Probability and Statistics, maintained by Jeff Miller.

[1] "Calculating Probabilities from Cumulative Distribution Function". 2021-08-09. Retrieved 2024-02-26.

[2] "Probability and stochastic processes", Applied Stochastic Processes, Chapman and Hall/CRC, pp. 9–36, 2013-07-22, ISBN 978-0-429-16812-3, retrieved 2023-12-08

[3] "Letters of the Greek Alphabet and Some of Their Statistical Uses". les.appstate.edu/. 1999-02-13. Retrieved 2024-02-26.

[4] "Order Statistics" (PDF). colorado.edu. Retrieved 2024-02-26.

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