Quantile-parameterized distribution explained
A quantile-parameterized distribution (QPD) is a probability distributions that is directly parameterized by data. They were created to meet the need for easy-to-use continuous probability distributions flexible enough to represent a wide range of uncertainties, such as those commonly encountered in business, economics, engineering, and science. Because QPDs are directly parameterized by data, they have the practical advantage of avoiding the intermediate step of parameter estimation, a time-consuming process that typically requires non-linear iterative methods to estimate probability-distribution parameters from data. Some QPDs have virtually unlimited shape flexibility and closed-form moments as well.
History
The development of quantile-parameterized distributions was inspired by the practical need for flexible continuous probability distributions that are easy to fit to data. Historically, the Pearson[1] and Johnson[2] [3] families of distributions have been used when shape flexibility is needed. That is because both families can match the first four moments (mean, variance, skewness, and kurtosis) of any data set. In many cases, however, these distributions are either difficult to fit to data or not flexible enough to fit the data appropriately.
For example, the beta distribution is a flexible Pearson distribution that is frequently used to model percentages of a population. However, if the characteristics of this population are such that the desired cumulative distribution function (CDF) should run through certain specific CDF points, there may be no beta distribution that meets this need. Because the beta distribution has only two shape parameters, it cannot, in general, match even three specified CDF points. Moreover, the beta parameters that best fit such data can be found only by nonlinear iterative methods.
Practitioners of decision analysis, needing distributions easily parameterized by three or more CDF points (e.g., because such points were specified as the result of an expert-elicitation process), originally invented quantile-parameterized distributions for this purpose. Keelin and Powley (2011)[4] provided the original definition. Subsequently, Keelin (2016)[5] developed the metalog distributions, a family of quantile-parameterized distributions that has virtually unlimited shape flexibility, simple equations, and closed-form moments.
Definition
Keelin and Powley define a quantile-parameterized distribution as one whose quantile function (inverse CDF) can be written in the form
F-1(y)=\left\{
\begin{array}{cl}
L0&for
aigi(y)&for0<y<1\\
L1&fory=1
\end{array}\right.
where
\begin{array}{rcl}
L0&=&
F-1(y)\\
L1&=&
F-1(y)
\end{array}
and the functions
are continuously differentiable and linearly independent basis functions. Here, essentially,
and
are the lower and upper bounds (if they exist) of a random variable with quantile function
. These distributions are called quantile-parameterized because for a given set of quantile pairs
\{(xi,yi)\midi=1,\ldots,n\}
, where
, and a set of
basis functions
, the coefficients
can be determined by solving a set of linear equations. If one desires to use more quantile pairs than basis functions, then the coefficients
can be chosen to minimize the sum of squared errors between the stated quantiles
and
. Keelin and Powley illustrate this concept for a specific choice of basis functions that is a generalization of quantile function of the
normal distribution,
, for which the mean
and standard deviation
are linear functions of cumulative probability
:
The result is a four-parameter distribution that can be fit to a set of four quantile/probability pairs exactly, or to any number of such pairs by linear least squares. Keelin and Powley call this the Simple Q-Normal distribution. Some skewed and symmetric Simple Q-Normal PDFs are shown in the figures below.
Properties
QPD’s that meet Keelin and Powley’s definition have the following properties.
Probability density function
Differentiating
with respect to
yields
. The reciprocal of this quantity,
, is the
probability density function (PDF)
f(y)=\left(
ai{{dgi(y)}\over{dy}}\right)-1
where
. Note that this PDF is expressed as a function of cumulative probability
rather than
. To plot it, as shown in the figures, vary
parametrically. Plot
on the horizontal axis and
on the vertical axis.
Feasibility
A function of the form of
is a feasible probability distribution if and only if
for all
. This implies a feasibility constraint on the set of coefficients
\boldsymbola=(a1,\ldots,an)\in\Rn
:
for all
In practical applications, feasibility must generally be checked rather than assumed.
Convexity
A QPD’s set of feasible coefficients
S\boldsymbola=\{\boldsymbola\in\Rn\mid
aidgi(y)/dy>0
for all
is
convex. Because
convex optimization requires convex feasible sets, this property simplifies optimization applications involving QPDs.
Fitting to data
The coefficients
can be determined from data by
linear least squares. Given
data points
that are intended to characterize the CDF of a QPD, and
matrix
whose elements consist of
, then, so long as
\boldsymbolYT\boldsymbolY
is invertible, coefficients' column vector
can be determined as
\boldsymbola=(\boldsymbolYT\boldsymbolY)-1\boldsymbolYT\boldsymbolx
, where
and column vector
\boldsymbolx=(x1,\ldots,xm)
. If
, this equation reduces to
\boldsymbola=\boldsymbolY-1\boldsymbolx
, where the resulting CDF runs through all data points exactly. An alternate method, implemented as a linear program, determines the coefficients by minimizing the sum of absolute distances between the CDF and the data subject to feasibility constraints.
[6] Shape flexibility
A QPD with
terms, where
, has
shape parameters. Thus, QPDs can be far more flexible than the
Pearson distributions, which have at most two shape parameters. For example, ten-term
metalog distributions parameterized by 105 CDF points from 30 traditional source distributions (including normal, student-t, lognormal, gamma, beta, and extreme value) have been shown to approximate each such source distribution within a
K–S distance of 0.001 or less.
[7] Transformations
and increasing function
is a
quantile function.
[8] For example, the
quantile function of the
normal distribution,
, is a QPD by the Keelin and Powley definition. The natural logarithm,
, is an increasing function, so
| \mu+\sigma\Phi-1(y) |
x=b | |
| l+e |
is the
quantile function of the
lognormal distribution with lower bound
. Importantly, this transformation converts an unbounded QPD into a semi-bounded QPD. Similarly, applying this log transformation to the unbounded metalog distribution
[9] yields the semi-bounded (log) metalog distribution;
[10] likewise, applying the logit transformation,
, yields the bounded (logit) metalog distribution with lower and upper bounds
and
, respectively. Moreover, by considering
to be
distributed, where
is any QPD that meets Keelin and Powley’s definition, the transformed variable maintains the above properties of feasibility, convexity, and fitting to data. Such transformed QPDs have greater shape flexibility than the underlying
, which has
shape parameters; the log transformation has
shape parameters, and the logit transformation has
shape parameters. Moreover, such transformed QPDs share the same set of feasible coefficients as the underlying untransformed QPD.
[11] Moments
The
moment of a QPD is:
E[xk]=
\left(
aigi(y)\right)kdy
Whether such moments exist in closed form depends on the choice of QPD basis functions
. The unbounded
metalog distribution and polynomial QPDs are examples of QPDs for which moments exist in closed form as functions of the coefficients
.
Simulation
Since the quantile function
is expressed in closed form, Keelin and Powley QPDs facilitate
Monte Carlo simulation. Substituting in uniformly distributed random samples of
produces random samples of
in closed form, thereby eliminating the need to invert a CDF expressed as
.
Related distributions
The following probability distributions are QPDs according to Keelin and Powley’s definition:
.
.
x=x0+\gamma\tan[\pi(y-0.5)]
.
.
and
parameters of the logistic quantile function.
- The semi-bounded and bounded metalog distributions, which are the log and logit transforms, respectively, of the unbounded metalog distribution.
- The SPT (symmetric-percentile triplet) unbounded, semi-bounded, and bounded metalog distributions, which are parameterized by three CDF points and optional upper and lower bounds.
- The Simple Q-Normal distribution[12]
- The metadistributions, including the meta-normal[13]
- Quantile functions expressed as polynomial functions of cumulative probability
, including
Chebyshev polynomial functions.
Like the SPT metalog distributions, the Johnson Quantile-Parameterized Distributions[14] [15] (JQPDs) are parameterized by three quantiles. JQPDs do not meet Keelin and Powley’s QPD definition, but rather have their own properties. JQPDs are feasible for all SPT parameter sets that are consistent with the rules of probability.
Applications
The original applications of QPDs were by decision analysts wishing to conveniently convert expert-assessed quantiles (e.g., 10th, 50th, and 90th quantiles) into smooth continuous probability distributions. QPDs have also been used to fit output data from simulations in order to represent those outputs (both CDFs and PDFs) as closed-form continuous distributions.[16] Used in this way, they are typically more stable and smoother than histograms. Similarly, since QPDs can impose fewer shape constraints than traditional distributions, they have been used to fit a wide range of empirical data in order to represent those data sets as continuous distributions (e.g., reflecting bimodality that may exist in the data in a straightforward manner[17]). Quantile parameterization enables a closed-form QPD representation of known distributions whose CDFs otherwise have no closed-form expression. Keelin et al. (2019)[18] apply this to the sum of independent identically distributed lognormal distributions, where quantiles of the sum can be determined by a large number of simulations. Nine such quantiles are used to parameterize a semi-bounded metalog distribution that runs through each of these nine quantiles exactly. QPDs have also been applied to assess the risks of asteroid impact,[19] cybersecurity,[20] biases in projections of oil-field production when compared to observed production after the fact,[21] and future Canadian population projections based on combining the probabilistic views of multiple experts.[22] See metalog distributions and Keelin (2016) for additional applications of the metalog distribution.
External links
Notes and References
- Johnson NL, Kotz S, Balakrishnan N. Continuous univariate distributions, Vol 1, Second Edition, John Wiley & Sons, Ltd, 1994, pp. 15–25.
- Systems of Frequency Curves Generated by Methods of Translation . 2332539 . Johnson . N. L. . Biometrika . 1949 . 36 . 1/2 . 149–176 . 10.2307/2332539 . 18132090 .
- Systems of Frequency Curves Generated by Transformations of Logistic Variables . 2335422 . Tadikamalla . Pandu R. . Johnson . Norman L. . Biometrika . 1982 . 69 . 2 . 461–465 . 10.1093/biomet/69.2.461 .
- 10.1287/deca.1110.0213 . Quantile-Parameterized Distributions . 2011 . Keelin . Thomas W. . Powley . Bradford W. . Decision Analysis . 8 . 3 . 206–219 .
- 10.1287/deca.2016.0338 . The Metalog Distributions . 2016 . Keelin . Thomas W. . Decision Analysis . 13 . 4 . 243–277 .
- Cyber risk management :AI-generated warnings of threats . 2019 . Stanford University . Faber . Isaac Justin . Paté-Cornell . M. Elisabeth . Lin . Herbert . Shachter . Ross D. .
- 10.1287/deca.2016.0338. Table 8 . The Metalog Distributions . 2016 . Keelin . Thomas W. . Decision Analysis . 13 . 4 .
- Gilchrist, W., 2000. Statistical modelling with quantile functions. CRC Press.
- 10.1287/deca.2016.0338. Section 3, pp. 249–257 . The Metalog Distributions . 2016 . Keelin . Thomas W. . Decision Analysis . 13 . 4 .
- 10.1287/deca.2016.0338. Section 4 . The Metalog Distributions . 2016 . Keelin . Thomas W. . Decision Analysis . 13 . 4 .
- http://metalogdistributions.com/images/Powley_Dissertation_2013-augmented.pdf Powley, B.W. (2013). “Quantile Function Methods For Decision Analysis”. Corollary 12, p 30. PhD Dissertation, Stanford University
- 10.1287/deca.1110.0213. pp. 208–210 . Quantile-Parameterized Distributions . 2011 . Keelin . Thomas W. . Powley . Bradford W. . Decision Analysis . 8 . 3 .
- 253 . 10.1287/deca.2016.0338 . The Metalog Distributions . 2016 . Keelin . Thomas W. . Decision Analysis . 13 . 4 .
- Johnson Quantile-Parameterized Distributions . 10.1287/deca.2016.0343 . 2017 . Hadlock . Christopher C. . Bickel . J. Eric . Decision Analysis . 14 . 35–64 .
- The Generalized Johnson Quantile-Parameterized Distribution System . 10.1287/deca.2018.0376 . 2019 . Hadlock . Christopher C. . Bickel . J. Eric . Decision Analysis . 16 . 67–85 . 159339224 .
- [doi:10.1287/deca.2016.0338|Keelin, T.W. (2016), Section 6.2.2, pp. 271–274.]
- [doi:10.1287/deca.2016.0338|Keelin, T.W. (2016), Section 6.1.1, Figure 10, pp 266–267.]
- Book: The metalog distributions and extremely accurate sums of lognormals in closed form . 9781728132839 . 18 May 2020 . 3074–3085 . Mustafee . N. . Institute of Electrical and Electronics Engineers (IEEE) .
- Asteroid Risk Assessment: A Probabilistic Approach . 10.1111/risa.12453 . 2016 . Reinhardt . Jason C. . Chen . Xi . Liu . Wenhao . Manchev . Petar . Paté-Cornell . M. Elisabeth . Risk Analysis . 36 . 2 . 244–261 . 26215051 . 2016RiskA..36..244R . 23308354 .
- A Bayesian network approach for cybersecurity risk assessment implementing and extending the FAIR model . 10.1016/j.cose.2019.101659 . 2020 . Wang . Jiali . Neil . Martin . Fenton . Norman . Computers & Security . 89 . 101659 . 209099797 .
- Production Forecasting: Optimistic and Overconfident—Over and over Again . 10.2118/195914-PA . 2020 . Bratvold . Reidar B. . Mohus . Erlend . Petutschnig . David . Bickel . Eric . Spe Reservoir Evaluation & Engineering . 23 . 3 . 0799–0810 . 219661316 .
- Book: Developments in Demographic Forecasting . 2020 . 978-3-030-42471-8 . The Springer Series on Demographic Methods and Population Analysis . 49 . 43–62 . 10.1007/978-3-030-42472-5 . 20.500.12657/42565 . 226615299.