InverseGaussianDistribution

Inverse Gaussian probability distribution object

Description

An InverseGaussianDistribution object consists of parameters, a model description, and sample data for an inverse Gaussian probability distribution.

Also known as the Wald distribution, the inverse Gaussian is used to model nonnegative positively skewed data. Inverse Gaussian distributions have many similarities to standard Gaussian (normal) distributions, which lead to applications in inferential statistics.

The inverse Gaussian distribution uses the following parameters.

Parameter	Description	Support
`mu`	Scale parameter	$μ > 0$
`lambda`	Shape parameter	$λ > 0$

Creation

There are several ways to create a InverseGaussianDistribution probability distribution object.

Create a distribution with specified parameter values using makedist.
Fit a distribution to data using fitdist.
Interactively fit a distribution to data using the Distribution Fitter app.

Properties

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Distribution Parameters

`mu` — Scale parameter
positive scalar value

Scale parameter for the inverse Gaussian distribution, specified as a positive scalar value.

Data Types: single | double

`lambda` — Shape parameter
positive scalar value

Shape parameter for the inverse Gaussian distribution, specified as a positive scalar value.

Data Types: single | double

Distribution Characteristics

`IsTruncated` — Logical flag for truncated distribution
`0` | `1`

This property is read-only.

Logical flag for truncated distribution, specified as a logical value. If IsTruncated equals 0, the distribution is not truncated. If IsTruncated equals 1, the distribution is truncated.

Data Types: logical

`NumParameters` — Number of parameters
positive integer value

This property is read-only.

Number of parameters for the probability distribution, specified as a positive integer value.

Data Types: double

`ParameterCovariance` — Covariance matrix of the parameter estimates
matrix of scalar values

This property is read-only.

Covariance matrix of the parameter estimates, specified as a p-by-p matrix, where p is the number of parameters in the distribution. The (i,j) element is the covariance between the estimates of the ith parameter and the jth parameter. The (i,i) element is the estimated variance of the ith parameter. If parameter i is fixed rather than estimated by fitting the distribution to data, then the (i,i) elements of the covariance matrix are 0.

Data Types: double

`ParameterIsFixed` — Logical flag for fixed parameters
array of logical values

This property is read-only.

Logical flag for fixed parameters, specified as an array of logical values. If 0, the corresponding parameter in the ParameterNames array is not fixed. If 1, the corresponding parameter in the ParameterNames array is fixed.

Data Types: logical

`ParameterValues` — Distribution parameter values
vector of scalar values

This property is read-only.

Distribution parameter values, specified as a vector of scalar values.

Data Types: single | double

`Truncation` — Truncation interval
vector of scalar values

This property is read-only.

Truncation interval for the probability distribution, specified as a vector of scalar values containing the lower and upper truncation boundaries.

Data Types: single | double

Other Object Properties

`DistributionName` — Probability distribution name
character vector

This property is read-only.

Probability distribution name, specified as a character vector.

Data Types: char

`InputData` — Data used for distribution fitting
structure

This property is read-only.

Data used for distribution fitting, specified as a structure containing the following:

data: Data vector used for distribution fitting.
cens: Censoring vector, or empty if none.
freq: Frequency vector, or empty if none.

Data Types: struct

`ParameterDescription` — Distribution parameter descriptions
cell array of character vectors

This property is read-only.

Distribution parameter descriptions, specified as a cell array of character vectors. Each cell contains a short description of one distribution parameter.

Data Types: char

`ParameterNames` — Distribution parameter names
cell array of character vectors

This property is read-only.

Distribution parameter names, specified as a cell array of character vectors.

Data Types: char

Object Functions

`cdf`	Cumulative distribution function
`gather`	Gather properties of Statistics and Machine Learning Toolbox object from GPU
`icdf`	Inverse cumulative distribution function
`iqr`	Interquartile range of probability distribution
`mean`	Mean of probability distribution
`median`	Median of probability distribution
`negloglik`	Negative loglikelihood of probability distribution
`paramci`	Confidence intervals for probability distribution parameters
`pdf`	Probability density function
`proflik`	Profile likelihood function for probability distribution
`random`	Random numbers
`std`	Standard deviation of probability distribution
`truncate`	Truncate probability distribution object
`var`	Variance of probability distribution

Examples

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Create an Inverse Gaussian Distribution Object Using Default Parameters

Open Live Script

Create an inverse Gaussian distribution object using the default parameter values.

pd = makedist('InverseGaussian')

pd = 
  InverseGaussianDistribution

  Inverse Gaussian distribution
        mu = 1
    lambda = 1

Create an Inverse Gaussian Distribution Object Using Specified Parameters

Open Live Script

Create an inverse Gaussian distribution object by specifying parameter values.

pd = makedist('InverseGaussian','mu',2,'lambda',4)

pd = 
  InverseGaussianDistribution

  Inverse Gaussian distribution
        mu = 2
    lambda = 4

Compute the standard deviation of the distribution.

s = std(pd)

s = 1.4142

Extended Capabilities

GPU Arrays
Accelerate code by running on a graphics processing unit (GPU) using Parallel Computing Toolbox™.

Usage notes and limitations:

InverseGaussianDistribution can be a probability distribution object fitted by using fitdist with GPU array input arguments.
The object functions of InverseGaussianDistribution fully support GPU arrays.

For more information, see Run MATLAB Functions on a GPU (Parallel Computing Toolbox).

Version History

Introduced in R2013a

InverseGaussianDistribution

Description

Creation

Properties

Distribution Parameters

`mu` — Scale parameter
positive scalar value

`lambda` — Shape parameter
positive scalar value

Distribution Characteristics

`IsTruncated` — Logical flag for truncated distribution
`0` | `1`

`NumParameters` — Number of parameters
positive integer value

`ParameterCovariance` — Covariance matrix of the parameter estimates
matrix of scalar values

`ParameterIsFixed` — Logical flag for fixed parameters
array of logical values

`ParameterValues` — Distribution parameter values
vector of scalar values

`Truncation` — Truncation interval
vector of scalar values

Other Object Properties

`DistributionName` — Probability distribution name
character vector

`InputData` — Data used for distribution fitting
structure

`ParameterDescription` — Distribution parameter descriptions
cell array of character vectors

`ParameterNames` — Distribution parameter names
cell array of character vectors

Object Functions

Examples

Create an Inverse Gaussian Distribution Object Using Default Parameters

Create an Inverse Gaussian Distribution Object Using Specified Parameters

Extended Capabilities

GPU Arrays
Accelerate code by running on a graphics processing unit (GPU) using Parallel Computing Toolbox™.

Version History

See Also

Topics

InverseGaussianDistribution

Description

Creation

Properties

Distribution Parameters

mu — Scale parameter positive scalar value

lambda — Shape parameter positive scalar value

Distribution Characteristics

IsTruncated — Logical flag for truncated distribution 0 | 1

NumParameters — Number of parameters positive integer value

ParameterCovariance — Covariance matrix of the parameter estimates matrix of scalar values

ParameterIsFixed — Logical flag for fixed parameters array of logical values

ParameterValues — Distribution parameter values vector of scalar values

Truncation — Truncation interval vector of scalar values

Other Object Properties

DistributionName — Probability distribution name character vector

InputData — Data used for distribution fitting structure

ParameterDescription — Distribution parameter descriptions cell array of character vectors

ParameterNames — Distribution parameter names cell array of character vectors

Object Functions

Examples

Create an Inverse Gaussian Distribution Object Using Default Parameters

Create an Inverse Gaussian Distribution Object Using Specified Parameters

Extended Capabilities

GPU Arrays Accelerate code by running on a graphics processing unit (GPU) using Parallel Computing Toolbox™.

Version History

See Also

Topics

`mu` — Scale parameter
positive scalar value

`lambda` — Shape parameter
positive scalar value

`IsTruncated` — Logical flag for truncated distribution
`0` | `1`

`NumParameters` — Number of parameters
positive integer value

`ParameterCovariance` — Covariance matrix of the parameter estimates
matrix of scalar values

`ParameterIsFixed` — Logical flag for fixed parameters
array of logical values

`ParameterValues` — Distribution parameter values
vector of scalar values

`Truncation` — Truncation interval
vector of scalar values

`DistributionName` — Probability distribution name
character vector

`InputData` — Data used for distribution fitting
structure

`ParameterDescription` — Distribution parameter descriptions
cell array of character vectors

`ParameterNames` — Distribution parameter names
cell array of character vectors

GPU Arrays
Accelerate code by running on a graphics processing unit (GPU) using Parallel Computing Toolbox™.