// Copyright 2013 The Rust Project Developers. See the COPYRIGHT // file at the top-level directory of this distribution and at // http://rust-lang.org/COPYRIGHT. // // Licensed under the Apache License, Version 2.0 or the MIT license // , at your // option. This file may not be copied, modified, or distributed // except according to those terms. // // ignore-lexer-test FIXME #15679 //! The Gamma and derived distributions. use self::GammaRepr::*; use self::ChiSquaredRepr::*; use {Rng, Open01}; use super::normal::StandardNormal; use super::{IndependentSample, Sample, Exp}; /// The Gamma distribution `Gamma(shape, scale)` distribution. /// /// The density function of this distribution is /// /// ```text /// f(x) = x^(k - 1) * exp(-x / θ) / (Γ(k) * θ^k) /// ``` /// /// where `Γ` is the Gamma function, `k` is the shape and `θ` is the /// scale and both `k` and `θ` are strictly positive. /// /// The algorithm used is that described by Marsaglia & Tsang 2000[1], /// falling back to directly sampling from an Exponential for `shape /// == 1`, and using the boosting technique described in [1] for /// `shape < 1`. /// /// # Example /// /// ```rust /// use rand::distributions::{IndependentSample, Gamma}; /// /// let gamma = Gamma::new(2.0, 5.0); /// let v = gamma.ind_sample(&mut rand::thread_rng()); /// println!("{} is from a Gamma(2, 5) distribution", v); /// ``` /// /// [1]: George Marsaglia and Wai Wan Tsang. 2000. "A Simple Method /// for Generating Gamma Variables" *ACM Trans. Math. Softw.* 26, 3 /// (September 2000), /// 363-372. DOI:[10.1145/358407.358414](http://doi.acm.org/10.1145/358407.358414) #[derive(Clone, Copy, Debug)] pub struct Gamma { repr: GammaRepr, } #[derive(Clone, Copy, Debug)] enum GammaRepr { Large(GammaLargeShape), One(Exp), Small(GammaSmallShape) } // These two helpers could be made public, but saving the // match-on-Gamma-enum branch from using them directly (e.g. if one // knows that the shape is always > 1) doesn't appear to be much // faster. /// Gamma distribution where the shape parameter is less than 1. /// /// Note, samples from this require a compulsory floating-point `pow` /// call, which makes it significantly slower than sampling from a /// gamma distribution where the shape parameter is greater than or /// equal to 1. /// /// See `Gamma` for sampling from a Gamma distribution with general /// shape parameters. #[derive(Clone, Copy, Debug)] struct GammaSmallShape { inv_shape: f64, large_shape: GammaLargeShape } /// Gamma distribution where the shape parameter is larger than 1. /// /// See `Gamma` for sampling from a Gamma distribution with general /// shape parameters. #[derive(Clone, Copy, Debug)] struct GammaLargeShape { scale: f64, c: f64, d: f64 } impl Gamma { /// Construct an object representing the `Gamma(shape, scale)` /// distribution. /// /// Panics if `shape <= 0` or `scale <= 0`. #[inline] pub fn new(shape: f64, scale: f64) -> Gamma { assert!(shape > 0.0, "Gamma::new called with shape <= 0"); assert!(scale > 0.0, "Gamma::new called with scale <= 0"); let repr = if shape == 1.0 { One(Exp::new(1.0 / scale)) } else if shape < 1.0 { Small(GammaSmallShape::new_raw(shape, scale)) } else { Large(GammaLargeShape::new_raw(shape, scale)) }; Gamma { repr: repr } } } impl GammaSmallShape { fn new_raw(shape: f64, scale: f64) -> GammaSmallShape { GammaSmallShape { inv_shape: 1. / shape, large_shape: GammaLargeShape::new_raw(shape + 1.0, scale) } } } impl GammaLargeShape { fn new_raw(shape: f64, scale: f64) -> GammaLargeShape { let d = shape - 1. / 3.; GammaLargeShape { scale: scale, c: 1. / (9. * d).sqrt(), d: d } } } impl Sample for Gamma { fn sample(&mut self, rng: &mut R) -> f64 { self.ind_sample(rng) } } impl Sample for GammaSmallShape { fn sample(&mut self, rng: &mut R) -> f64 { self.ind_sample(rng) } } impl Sample for GammaLargeShape { fn sample(&mut self, rng: &mut R) -> f64 { self.ind_sample(rng) } } impl IndependentSample for Gamma { fn ind_sample(&self, rng: &mut R) -> f64 { match self.repr { Small(ref g) => g.ind_sample(rng), One(ref g) => g.ind_sample(rng), Large(ref g) => g.ind_sample(rng), } } } impl IndependentSample for GammaSmallShape { fn ind_sample(&self, rng: &mut R) -> f64 { let Open01(u) = rng.gen::>(); self.large_shape.ind_sample(rng) * u.powf(self.inv_shape) } } impl IndependentSample for GammaLargeShape { fn ind_sample(&self, rng: &mut R) -> f64 { loop { let StandardNormal(x) = rng.gen::(); let v_cbrt = 1.0 + self.c * x; if v_cbrt <= 0.0 { // a^3 <= 0 iff a <= 0 continue } let v = v_cbrt * v_cbrt * v_cbrt; let Open01(u) = rng.gen::>(); let x_sqr = x * x; if u < 1.0 - 0.0331 * x_sqr * x_sqr || u.ln() < 0.5 * x_sqr + self.d * (1.0 - v + v.ln()) { return self.d * v * self.scale } } } } /// The chi-squared distribution `χ²(k)`, where `k` is the degrees of /// freedom. /// /// For `k > 0` integral, this distribution is the sum of the squares /// of `k` independent standard normal random variables. For other /// `k`, this uses the equivalent characterisation /// `χ²(k) = Gamma(k/2, 2)`. /// /// # Example /// /// ```rust /// use rand::distributions::{ChiSquared, IndependentSample}; /// /// let chi = ChiSquared::new(11.0); /// let v = chi.ind_sample(&mut rand::thread_rng()); /// println!("{} is from a χ²(11) distribution", v) /// ``` #[derive(Clone, Copy, Debug)] pub struct ChiSquared { repr: ChiSquaredRepr, } #[derive(Clone, Copy, Debug)] enum ChiSquaredRepr { // k == 1, Gamma(alpha, ..) is particularly slow for alpha < 1, // e.g. when alpha = 1/2 as it would be for this case, so special- // casing and using the definition of N(0,1)^2 is faster. DoFExactlyOne, DoFAnythingElse(Gamma), } impl ChiSquared { /// Create a new chi-squared distribution with degrees-of-freedom /// `k`. Panics if `k < 0`. pub fn new(k: f64) -> ChiSquared { let repr = if k == 1.0 { DoFExactlyOne } else { assert!(k > 0.0, "ChiSquared::new called with `k` < 0"); DoFAnythingElse(Gamma::new(0.5 * k, 2.0)) }; ChiSquared { repr: repr } } } impl Sample for ChiSquared { fn sample(&mut self, rng: &mut R) -> f64 { self.ind_sample(rng) } } impl IndependentSample for ChiSquared { fn ind_sample(&self, rng: &mut R) -> f64 { match self.repr { DoFExactlyOne => { // k == 1 => N(0,1)^2 let StandardNormal(norm) = rng.gen::(); norm * norm } DoFAnythingElse(ref g) => g.ind_sample(rng) } } } /// The Fisher F distribution `F(m, n)`. /// /// This distribution is equivalent to the ratio of two normalised /// chi-squared distributions, that is, `F(m,n) = (χ²(m)/m) / /// (χ²(n)/n)`. /// /// # Example /// /// ```rust /// use rand::distributions::{FisherF, IndependentSample}; /// /// let f = FisherF::new(2.0, 32.0); /// let v = f.ind_sample(&mut rand::thread_rng()); /// println!("{} is from an F(2, 32) distribution", v) /// ``` #[derive(Clone, Copy, Debug)] pub struct FisherF { numer: ChiSquared, denom: ChiSquared, // denom_dof / numer_dof so that this can just be a straight // multiplication, rather than a division. dof_ratio: f64, } impl FisherF { /// Create a new `FisherF` distribution, with the given /// parameter. Panics if either `m` or `n` are not positive. pub fn new(m: f64, n: f64) -> FisherF { assert!(m > 0.0, "FisherF::new called with `m < 0`"); assert!(n > 0.0, "FisherF::new called with `n < 0`"); FisherF { numer: ChiSquared::new(m), denom: ChiSquared::new(n), dof_ratio: n / m } } } impl Sample for FisherF { fn sample(&mut self, rng: &mut R) -> f64 { self.ind_sample(rng) } } impl IndependentSample for FisherF { fn ind_sample(&self, rng: &mut R) -> f64 { self.numer.ind_sample(rng) / self.denom.ind_sample(rng) * self.dof_ratio } } /// The Student t distribution, `t(nu)`, where `nu` is the degrees of /// freedom. /// /// # Example /// /// ```rust /// use rand::distributions::{StudentT, IndependentSample}; /// /// let t = StudentT::new(11.0); /// let v = t.ind_sample(&mut rand::thread_rng()); /// println!("{} is from a t(11) distribution", v) /// ``` #[derive(Clone, Copy, Debug)] pub struct StudentT { chi: ChiSquared, dof: f64 } impl StudentT { /// Create a new Student t distribution with `n` degrees of /// freedom. Panics if `n <= 0`. pub fn new(n: f64) -> StudentT { assert!(n > 0.0, "StudentT::new called with `n <= 0`"); StudentT { chi: ChiSquared::new(n), dof: n } } } impl Sample for StudentT { fn sample(&mut self, rng: &mut R) -> f64 { self.ind_sample(rng) } } impl IndependentSample for StudentT { fn ind_sample(&self, rng: &mut R) -> f64 { let StandardNormal(norm) = rng.gen::(); norm * (self.dof / self.chi.ind_sample(rng)).sqrt() } } #[cfg(test)] mod test { use distributions::{Sample, IndependentSample}; use super::{ChiSquared, StudentT, FisherF}; #[test] fn test_chi_squared_one() { let mut chi = ChiSquared::new(1.0); let mut rng = ::test::rng(); for _ in 0..1000 { chi.sample(&mut rng); chi.ind_sample(&mut rng); } } #[test] fn test_chi_squared_small() { let mut chi = ChiSquared::new(0.5); let mut rng = ::test::rng(); for _ in 0..1000 { chi.sample(&mut rng); chi.ind_sample(&mut rng); } } #[test] fn test_chi_squared_large() { let mut chi = ChiSquared::new(30.0); let mut rng = ::test::rng(); for _ in 0..1000 { chi.sample(&mut rng); chi.ind_sample(&mut rng); } } #[test] #[should_panic] fn test_chi_squared_invalid_dof() { ChiSquared::new(-1.0); } #[test] fn test_f() { let mut f = FisherF::new(2.0, 32.0); let mut rng = ::test::rng(); for _ in 0..1000 { f.sample(&mut rng); f.ind_sample(&mut rng); } } #[test] fn test_t() { let mut t = StudentT::new(11.0); let mut rng = ::test::rng(); for _ in 0..1000 { t.sample(&mut rng); t.ind_sample(&mut rng); } } }