Probability density function: Difference between revisions

In probability theory, a probability density function (PDF), or density of a continuous random variable, is a function that describes the relative likelihood for this random variable to take on a given value. The probability of the random variable falling within a particular range of values is given by the integral of this variable’s density over that range—that is, it is given by the area under the density function but above the horizontal axis and between the lowest and greatest values of the range. The probability density function is nonnegative everywhere, and its integral over the entire space is equal to one.

The terms "probability distribution function"^[2] and "probability function"^[3] have also sometimes been used to denote the probability density function. However, this use is not standard among probabilists and statisticians. In other sources, "probability distribution function" may be used when the probability distribution is defined as a function over general sets of values, or it may refer to the cumulative distribution function, or it may be a probability mass function (PMF) rather than the density. Further confusion of terminology exists because density function has also been used for what is here called the "probability mass function" (PMF).^[4] In general though, the PMF is used in the context of discrete random variables (random variables that take values on a discrete set), while PDF is used in the context of continuous random variables.

Suppose a species of bacteria typically lives 4 to 6 hours. What is the probability that a bacterium lives exactly 5 hours? The answer is 0%. A lot of bacteria live for approximately 5 hours, but there is no chance that any given bacterium dies at exactly 5.0000000000... hours.

Instead we might ask: What is the probability that the bacterium dies between 5 hours and 5.01 hours? Let's say the answer is 0.02 (i.e., 2%). Next: What is the probability that the bacterium dies between 5 hours and 5.001 hours? The answer is probably around 0.002, since this is 1/10th of the previous interval. The probability that the bacterium dies between 5 hours and 5.0001 hours is probably about 0.0002, and so on.

In these three examples, the ratio (probability of dying during an interval) / (duration of the interval) is approximately constant, and equal to 2 per hour (or 2 hour⁻¹). For example, there is 0.02 probability of dying in the 0.01-hour interval between 5 and 5.01 hours, and (0.02 probability / 0.01 hours) = 2 hour⁻¹. This quantity 2 hour⁻¹ is called the probability density for dying at around 5 hours.

Therefore, in response to the question "What is the probability that the bacterium dies at 5 hours?", a literally correct but unhelpful answer is "0", but a better answer can be written as (2 hour⁻¹) dt. This is the probability that the bacterium dies within a small (infinitesimal) window of time around 5 hours, where dt is the duration of this window.

For example, the probability that it lives longer than 5 hours, but shorter than (5 hours + 1 nanosecond), is (2 hour⁻¹)×(1 nanosecond) ≃ 6×10⁻¹³ (using the unit conversion 3.6×10¹² nanoseconds = 1 hour).

There is a probability density function f with f(5 hours) = 2 hour⁻¹. The integral of f over any window of time (not only infinitesimal windows but also large windows) is the probability that the bacterium dies in that window.

A probability density function is most commonly associated with absolutely continuous univariate distributions. A random variable X has density f_X, where f_X is a non-negative Lebesgue-integrable function, if:

${\displaystyle \Pr[a\leq X\leq b]=\int _{a}^{b}f_{X}(x)\,dx.}$

Hence, if F_X is the cumulative distribution function of X, then:

${\displaystyle F_{X}(x)=\int _{-\infty }^{x}f_{X}(u)\,du,}$

and (if f_X is continuous at x)

${\displaystyle f_{X}(x)={\frac {d}{dx}}F_{X}(x).}$

Intuitively, one can think of f_X(x) dx as being the probability of X falling within the infinitesimal interval [x, x + dx].

(This definition may be extended to any probability distribution using the measure-theoretic definition of probability.)

A random variable X with values in a measurable space ${\displaystyle ({\mathcal {X}},{\mathcal {A}})}$ (usually Rⁿ with the Borel sets as measurable subsets) has as probability distribution the measure X_∗P on ${\displaystyle ({\mathcal {X}},{\mathcal {A}})}$: the density of X with respect to a reference measure μ on ${\displaystyle ({\mathcal {X}},{\mathcal {A}})}$ is the Radon–Nikodym derivative:

${\displaystyle f={\frac {dX_{*}P}{d\mu }}.}$

That is, f is any measurable function with the property that:

${\displaystyle \Pr[X\in A]=\int _{X^{-1}A}\,dP=\int _{A}f\,d\mu }$

for any measurable set ${\displaystyle A\in {\mathcal {A}}}$.

In the continuous univariate case above, the reference measure is the Lebesgue measure. The probability mass function of a discrete random variable is the density with respect to the counting measure over the sample space (usually the set of integers, or some subset thereof).

Note that it is not possible to define a density with reference to an arbitrary measure (e.g. one can't choose the counting measure as a reference for a continuous random variable). Furthermore, when it does exist, the density is almost everywhere unique.

Unlike a probability, a probability density function can take on values greater than one; for example, the uniform distribution on the interval [0, ½] has probability density f(x) = 2 for 0 ≤ x ≤ ½ and f(x) = 0 elsewhere.

The standard normal distribution has probability density

${\displaystyle f(x)={\frac {1}{\sqrt {2\pi }}}\;e^{-x^{2}/2}.}$

If a random variable X is given and its distribution admits a probability density function f, then the expected value of X (if the expected value exists) can be calculated as

${\displaystyle \operatorname {E} [X]=\int _{-\infty }^{\infty }x\,f(x)\,dx.}$

Not every probability distribution has a density function: the distributions of discrete random variables do not; nor does the Cantor distribution, even though it has no discrete component, i.e., does not assign positive probability to any individual point.

A distribution has a density function if and only if its cumulative distribution function F(x) is absolutely continuous. In this case: F is almost everywhere differentiable, and its derivative can be used as probability density:

${\displaystyle {\frac {d}{dx}}F(x)=f(x).}$

If a probability distribution admits a density, then the probability of every one-point set {a} is zero; the same holds for finite and countable sets.

Two probability densities f and g represent the same probability distribution precisely if they differ only on a set of Lebesgue measure zero.

In the field of statistical physics, a non-formal reformulation of the relation above between the derivative of the cumulative distribution function and the probability density function is generally used as the definition of the probability density function. This alternate definition is the following:

If dt is an infinitely small number, the probability that X is included within the interval (t, t + dt) is equal to f(t) dt, or:

${\displaystyle \Pr(t<X<t+dt)=f(t)\,dt.}$

It is possible to represent certain discrete random variables as well as random variables involving both a continuous and a discrete part with a generalized probability density function, by using the Dirac delta function. For example, let us consider a binary discrete random variable having the Rademacher distribution—that is, taking −1 or 1 for values, with probability ½ each. The density of probability associated with this variable is:

${\displaystyle f(t)={\frac {1}{2}}(\delta (t+1)+\delta (t-1)).}$

More generally, if a discrete variable can take n different values among real numbers, then the associated probability density function is:

${\displaystyle f(t)=\sum _{i=1}^{n}p_{i}\,\delta (t-x_{i}),}$

where x₁, …, x_n are the discrete values accessible to the variable and p₁, …, p_n are the probabilities associated with these values.

This substantially unifies the treatment of discrete and continuous probability distributions. For instance, the above expression allows for determining statistical characteristics of such a discrete variable (such as its mean, its variance and its kurtosis), starting from the formulas given for a continuous distribution of the probability.

It is common for probability density functions (and probability mass functions) to be parametrized—that is, to be characterized by unspecified parameters. For example, the normal distribution is parametrized in terms of the mean and the variance, denoted by ${\displaystyle \mu }$ and ${\displaystyle \sigma ^{2}}$ respectively, giving the family of densities

${\displaystyle f(x;\mu ,\sigma ^{2})={\frac {1}{\sigma {\sqrt {2\pi }}}}e^{-{\frac {1}{2}}\left({\frac {x-\mu }{\sigma }}\right)^{2}}.}$

It is important to keep in mind the difference between the domain of a family of densities and the parameters of the family. Different values of the parameters describe different distributions of different random variables on the same sample space (the same set of all possible values of the variable); this sample space is the domain of the family of random variables that this family of distributions describes. A given set of parameters describes a single distribution within the family sharing the functional form of the density. From the perspective of a given distribution, the parameters are constants, and terms in a density function that contain only parameters, but not variables, are part of the normalization factor of a distribution (the multiplicative factor that ensures that the area under the density—the probability of something in the domain occurring— equals 1). This normalization factor is outside the kernel of the distribution.

Since the parameters are constants, reparametrizing a density in terms of different parameters, to give a characterization of a different random variable in the family, means simply substituting the new parameter values into the formula in place of the old ones. Changing the domain of a probability density, however, is trickier and requires more work: see the section below on change of variables.

For continuous random variables X₁, …, X_n, it is also possible to define a probability density function associated to the set as a whole, often called joint probability density function. This density function is defined as a function of the n variables, such that, for any domain D in the n-dimensional space of the values of the variables X₁, …, X_n, the probability that a realisation of the set variables falls inside the domain D is

${\displaystyle \Pr \left(X_{1},\cdots ,X_{n}\in D\right)=\int _{D}f_{X_{1},\cdots ,X_{n}}(x_{1},\cdots ,x_{n})\,dx_{1}\cdots dx_{n}.}$

If F(x₁, …, x_n) = Pr(X₁ ≤ x₁, …, X_n ≤ x_n) is the cumulative distribution function of the vector (X₁, …, X_n), then the joint probability density function can be computed as a partial derivative

${\displaystyle f(x)={\frac {\partial ^{n}F}{\partial x_{1}\cdots \partial x_{n}}}{\bigg |}_{x}}$

For i=1, 2, …,n, let f_Xi(x_i) be the probability density function associated with variable X_i alone. This is called the “marginal” density function, and can be deduced from the probability density associated with the random variables X₁, …, X_n by integrating on all values of the n − 1 other variables:

${\displaystyle f_{X_{i}}(x_{i})=\int f(x_{1},\cdots ,x_{n})\,dx_{1}\cdots dx_{i-1}\,dx_{i+1}\cdots dx_{n}.}$

Continuous random variables X₁, …, X_n admitting a joint density are all independent from each other if and only if

${\displaystyle f_{X_{1},\cdots ,X_{n}}(x_{1},\cdots ,x_{n})=f_{X_{1}}(x_{1})\cdots f_{X_{n}}(x_{n}).}$

If the joint probability density function of a vector of n random variables can be factored into a product of n functions of one variable

${\displaystyle f_{X_{1},\cdots ,X_{n}}(x_{1},\cdots ,x_{n})=f_{1}(x_{1})\cdots f_{n}(x_{n}),}$

(where each f_i is not necessarily a density) then the n variables in the set are all independent from each other, and the marginal probability density function of each of them is given by

${\displaystyle f_{X_{i}}(x_{i})={\frac {f_{i}(x_{i})}{\int f_{i}(x)\,dx}}.}$

This elementary example illustrates the above definition of multidimensional probability density functions in the simple case of a function of a set of two variables. Let us call ${\displaystyle {\vec {R}}}$ a 2-dimensional random vector of coordinates (X, Y): the probability to obtain ${\displaystyle {\vec {R}}}$ in the quarter plane of positive x and y is

${\displaystyle \Pr \left(X>0,Y>0\right)=\int _{0}^{\infty }\int _{0}^{\infty }f_{X,Y}(x,y)\,dx\,dy.}$

If the probability density function of a random variable X is given as f_X(x), it is possible (but often not necessary; see below) to calculate the probability density function of some variable Y = g(X). This is also called a “change of variable” and is in practice used to generate a random variable of arbitrary shape f_g(X) = f_Y using a known (for instance uniform) random number generator.

If the function g is monotonic, then the resulting density function is

${\displaystyle f_{Y}(y)=\left|{\frac {d}{dy}}(g^{-1}(y))\right|\cdot f_{X}(g^{-1}(y)).}$

Here g⁻¹ denotes the inverse function.

This follows from the fact that the probability contained in a differential area must be invariant under change of variables. That is,

${\displaystyle \left|f_{Y}(y)\,dy\right|=\left|f_{X}(x)\,dx\right|,}$

or

${\displaystyle f_{Y}(y)=\left|{\frac {dx}{dy}}\right|f_{X}(x)=\left|{\frac {d}{dy}}(x)\right|f_{X}(x)=\left|{\frac {d}{dy}}(g^{-1}(y))\right|f_{X}(g^{-1}(y))={\frac {f_{X}(g^{-1}(y))}{|g'(g^{-1}(y))|}}.}$

For functions which are not monotonic the probability density function for y is

${\displaystyle \sum _{k=1}^{n(y)}\left|{\frac {d}{dy}}g_{k}^{-1}(y)\right|\cdot f_{X}(g_{k}^{-1}(y))}$

where n(y) is the number of solutions in x for the equation g(x) = y, and g⁻¹_k(y) are these solutions.

It is tempting to think that in order to find the expected value E(g(X)) one must first find the probability density f_g(X) of the new random variable Y = g(X). However, rather than computing

${\displaystyle \operatorname {E} (g(X))=\int _{-\infty }^{\infty }yf_{g(X)}(y)\,dy,}$

one may find instead

${\displaystyle \operatorname {E} (g(X))=\int _{-\infty }^{\infty }g(x)f_{X}(x)\,dx.}$

The values of the two integrals are the same in all cases in which both X and g(X) actually have probability density functions. It is not necessary that g be a one-to-one function. In some cases the latter integral is computed much more easily than the former. See Law of the unconscious statistician.

The above formulas can be generalized to variables (which we will again call y) depending on more than one other variable. f(x₁, …, x_n) shall denote the probability density function of the variables that y depends on, and the dependence shall be y = g(x₁, …, x_n). Then, the resulting density function is^{[citation needed]}

${\displaystyle \int \limits _{y=g(x_{1},\cdots ,x_{n})}{\frac {f(x_{1},\cdots ,x_{n})}{\sqrt {\sum _{j=1}^{n}{\frac {\partial g}{\partial x_{j}}}(x_{1},\cdots ,x_{n})^{2}}}}\;dV}$

where the integral is over the entire (n-1)-dimensional solution of the subscripted equation and the symbolic dV must be replaced by a parametrization of this solution for a particular calculation; the variables x₁, …, x_n are then of course functions of this parametrization.

This derives from the following, perhaps more intuitive representation: Suppose x is an n-dimensional random variable with joint density f. If y = H(x), where H is a bijective, differentiable function, then y has density g:

${\displaystyle g(\mathbf {y} )=f(\mathbf {x} )\left\vert \det \left({\frac {d\mathbf {x} }{d\mathbf {y} }}\right)\right\vert }$

with the differential regarded as the Jacobian of the inverse of H, evaluated at y.

Using the delta-function (and assuming independence) the same result is formulated as follows.

If the probability density function of independent random variables X_i, i = 1, 2, …n are given as f_Xi(x_i), it is possible to calculate the probability density function of some variable Y = G(X₁, X₂, …X_n). The following formula establishes a connection between the probability density function of Y denoted by f_Y(y) and f_Xi(x_i) using the Dirac delta function:

${\displaystyle f_{Y}(y)=\int _{-\infty }^{\infty }\int _{-\infty }^{\infty }\cdots \int _{-\infty }^{\infty }f_{X_{1}}(x_{1})f_{X_{2}}(x_{2})\cdots f_{X_{n}}(x_{n})\delta (y-G(x_{1},x_{2},\cdots ,x_{n}))\,dx_{1}\,dx_{2}\,\cdots dx_{n}}$

Not to be confused with Mixture distribution

The probability density function of the sum of two independent random variables U and V, each of which has a probability density function, is the convolution of their separate density functions:

${\displaystyle f_{U+V}(x)=\int _{-\infty }^{\infty }f_{U}(y)f_{V}(x-y)\,dy=\left(f_{U}*f_{V}\right)(x)}$

It is possible to generalize the previous relation to a sum of N independent random variables, with densities U₁, …, U_N:

${\displaystyle f_{U_{1}+\cdots +U_{N}}(x)=\left(f_{U_{1}}*\cdots *f_{U_{N}}\right)(x)}$

This can be derived from a two-way change of variables involving Y=U+V and Z=V, similarly to the example below for the quotient of independent random variables.

Given two independent random variables U and V, each of which has a probability density function, the density of the product Y=UV and quotient Y=U/V can be computed by a change of variables.

To compute the quotient Y=U/V of two independent random variables U and V, define the following transformation:

${\displaystyle Y=U/V}$

${\displaystyle Z=V}$

Then, the joint density p(Y,Z) can be computed by a change of variables from U,V to Y,Z, and Y can be derived by marginalizing out Z from the joint density.

The inverse transformation is

${\displaystyle U=YZ}$

${\displaystyle V=Z}$

The Jacobian matrix ${\displaystyle J(U,V|Y,Z)}$ of this transformation is

${\displaystyle {\begin{vmatrix}{\frac {\partial U}{\partial Y}}&{\frac {\partial U}{\partial Z}}\\{\frac {\partial V}{\partial Y}}&{\frac {\partial V}{\partial Z}}\\\end{vmatrix}}={\begin{vmatrix}Z&Y\\0&1\\\end{vmatrix}}=|Z|.}$

Thus:

${\displaystyle p(Y,Z)=p(U,V)\,J(U,V|Y,Z)=p(U)\,p(V)\,J(U,V|Y,Z)=p_{U}(YZ)\,p_{V}(Z)\,|Z|.}$

And the distribution of Y can be computed by marginalizing out Z:

${\displaystyle p(Y)=\int _{-\infty }^{\infty }p_{U}(YZ)\,p_{V}(Z)\,|Z|\,dZ}$

Note that this method crucially requires that the transformation from U,V to Y,Z be bijective. The above transformation meets this because Z can be mapped directly back to V, and for a given V the quotient U/V is monotonic. This is similarly the case for the sum U+V, difference U-V and product UV.

Exactly the same method can be used to compute the distribution of other functions of multiple independent random variables.

Given two standard normal variables U and V, the quotient can be computed as follows. First, the variables have the following density functions:

${\displaystyle p(U)={\frac {1}{\sqrt {2\pi }}}e^{-{\frac {U^{2}}{2}}}}$

${\displaystyle p(V)={\frac {1}{\sqrt {2\pi }}}e^{-{\frac {V^{2}}{2}}}}$

We transform as described above:

${\displaystyle Y=U/V}$

${\displaystyle Z=V}$

This leads to:

${\displaystyle {\begin{aligned}p(Y)&=\int _{-\infty }^{\infty }p_{U}(YZ)\,p_{V}(Z)\,|Z|\,dZ\\&=\int _{-\infty }^{\infty }{\frac {1}{\sqrt {2\pi }}}e^{-{\frac {1}{2}}Y^{2}Z^{2}}{\frac {1}{\sqrt {2\pi }}}e^{-{\frac {1}{2}}Z^{2}}|Z|\,dZ\\&=\int _{-\infty }^{\infty }{\frac {1}{2\pi }}e^{-{\frac {1}{2}}(Y^{2}+1)Z^{2}}|Z|\,dZ\\&=2\int _{0}^{\infty }{\frac {1}{2\pi }}e^{-{\frac {1}{2}}(Y^{2}+1)Z^{2}}Z\,dZ\\&=\int _{0}^{\infty }{\frac {1}{\pi }}e^{-(Y^{2}+1)u}\,du&&u={\tfrac {1}{2}}Z^{2}\\&=\left.-{\frac {1}{\pi (Y^{2}+1)}}e^{-(Y^{2}+1)u}\right]_{u=0}^{\infty }\\&={\frac {1}{\pi (Y^{2}+1)}}\end{aligned}}}$

This is a standard Cauchy distribution.

• Pierre Simon de Laplace (1812). Analytical Theory of Probability.

The first major treatise blending calculus with probability theory, originally in French: Théorie Analytique des Probabilités.

• Andrei Nikolajevich Kolmogorov (1950). Foundations of the Theory of Probability.

The modern measure-theoretic foundation of probability theory; the original German version (Grundbegriffe der Wahrscheinlichkeitsrechnung) appeared in 1933.

• Patrick Billingsley (1979). Probability and Measure. New York, Toronto, London: John Wiley and Sons. ISBN 0-471-00710-2.

• David Stirzaker (2003). Elementary Probability. ISBN 0-521-42028-8.

Chapters 7 to 9 are about continuous variables.

• Ushakov, N.G. (2001) [1994], "Density of a probability distribution", Encyclopedia of Mathematics, EMS Press
• Weisstein, Eric W. "Probability density function". MathWorld.