Struct statrs::distribution::Gamma

source · 
pub struct Gamma { /* private fields */ }
Expand description

Implements the Gamma distribution

Examples

use statrs::distribution::{Gamma, Continuous};
use statrs::statistics::Distribution;
use statrs::prec;

let n = Gamma::new(3.0, 1.0).unwrap();
assert_eq!(n.mean().unwrap(), 3.0);
assert!(prec::almost_eq(n.pdf(2.0), 0.270670566473225383788, 1e-15));

Implementations§

Constructs a new gamma distribution with a shape (α) of shape and a rate (β) of rate

Errors

Returns an error if shape is ‘NaN’ or inf or rate is NaN or inf. Also returns an error if shape <= 0.0 or rate <= 0.0

Examples
use statrs::distribution::Gamma;

let mut result = Gamma::new(3.0, 1.0);
assert!(result.is_ok());

result = Gamma::new(0.0, 0.0);
assert!(result.is_err());

Returns the shape (α) of the gamma distribution

Examples
use statrs::distribution::Gamma;

let n = Gamma::new(3.0, 1.0).unwrap();
assert_eq!(n.shape(), 3.0);

Returns the rate (β) of the gamma distribution

Examples
use statrs::distribution::Gamma;

let n = Gamma::new(3.0, 1.0).unwrap();
assert_eq!(n.rate(), 1.0);

Trait Implementations§

Returns a copy of the value. Read more
Performs copy-assignment from source. Read more

Calculates the probability density function for the gamma distribution at x

Remarks

Returns NAN if any of shape or rate are INF or if x is INF

Formula
(β^α / Γ(α)) * x^(α - 1) * e^(-β * x)

where α is the shape, β is the rate, and Γ is the gamma function

Calculates the log probability density function for the gamma distribution at x

Remarks

Returns NAN if any of shape or rate are INF or if x is INF

Formula
ln((β^α / Γ(α)) * x^(α - 1) * e ^(-β * x))

where α is the shape, β is the rate, and Γ is the gamma function

Calculates the cumulative distribution function for the gamma distribution at x

Formula
(1 / Γ(α)) * γ(α, β * x)

where α is the shape, β is the rate, Γ is the gamma function, and γ is the lower incomplete gamma function

Due to issues with rounding and floating-point accuracy the default implementation may be ill-behaved. Specialized inverse cdfs should be used whenever possible. Performs a binary search on the domain of cdf to obtain an approximation of F^-1(p) := inf { x | F(x) >= p }. Needless to say, performance may may be lacking. Read more
Formats the value using the given formatter. Read more
Generate a random value of T, using rng as the source of randomness.
Create an iterator that generates random values of T, using rng as the source of randomness. Read more
Create a distribution of values of ‘S’ by mapping the output of Self through the closure F Read more

Returns the mean of the gamma distribution

Formula
α / β

where α is the shape and β is the rate

Returns the variance of the gamma distribution

Formula
α / β^2

where α is the shape and β is the rate

Returns the entropy of the gamma distribution

Formula
α - ln(β) + ln(Γ(α)) + (1 - α) * ψ(α)

where α is the shape, β is the rate, Γ is the gamma function, and ψ is the digamma function

Returns the skewness of the gamma distribution

Formula
2 / sqrt(α)

where α is the shape

Returns the standard deviation, if it exists. Read more

Returns the maximum value in the domain of the gamma distribution representable by a double precision float

Formula
INF

Returns the minimum value in the domain of the gamma distribution representable by a double precision float

Formula
0

Returns the mode for the gamma distribution

Formula
(α - 1) / β

where α is the shape and β is the rate

This method tests for self and other values to be equal, and is used by ==. Read more
This method tests for !=. The default implementation is almost always sufficient, and should not be overridden without very good reason. Read more

Auto Trait Implementations§

Blanket Implementations§

Gets the TypeId of self. Read more
Immutably borrows from an owned value. Read more
Mutably borrows from an owned value. Read more

Returns the argument unchanged.

Calls U::from(self).

That is, this conversion is whatever the implementation of From<T> for U chooses to do.

Should always be Self
Performance hack: Clone doesn’t get inlined for Copy types in debug mode, so make it inline anyway.
Tests if Self the same as the type T Read more
The inverse inclusion map: attempts to construct self from the equivalent element of its superset. Read more
Checks if self is actually part of its subset T (and can be converted to it).
Use with care! Same as self.to_subset but without any property checks. Always succeeds.
The inclusion map: converts self to the equivalent element of its superset.
The resulting type after obtaining ownership.
Creates owned data from borrowed data, usually by cloning. Read more
Uses borrowed data to replace owned data, usually by cloning. Read more
The type returned in the event of a conversion error.
Performs the conversion.
The type returned in the event of a conversion error.
Performs the conversion.