rand_distr/src/exponential.rs - third_party/rust-mirrors/rand - Git at Google

 // Copyright 2018 Developers of the Rand project.
 // Copyright 2013 The Rust Project Developers.
 //
 // Licensed under the Apache License, Version 2.0 <LICENSE-APACHE or
 // https://www.apache.org/licenses/LICENSE-2.0> or the MIT license
 // <LICENSE-MIT or https://opensource.org/licenses/MIT>, at your
 // option. This file may not be copied, modified, or distributed
 // except according to those terms.

 //! The exponential distribution.

 use crate::utils::ziggurat;
 use num_traits::Float;
 use crate::{ziggurat_tables, Distribution};
 use rand::Rng;
 use core::fmt;

 /// Samples floating-point numbers according to the exponential distribution,
 /// with rate parameter `λ = 1`. This is equivalent to `Exp::new(1.0)` or
 /// sampling with `-rng.gen::<f64>().ln()`, but faster.
 ///
 /// See `Exp` for the general exponential distribution.
 ///
 /// Implemented via the ZIGNOR variant[^1] of the Ziggurat method. The exact
 /// description in the paper was adjusted to use tables for the exponential
 /// distribution rather than normal.
 ///
 /// [^1]: Jurgen A. Doornik (2005). [*An Improved Ziggurat Method to
 ///       Generate Normal Random Samples*](
 ///       https://www.doornik.com/research/ziggurat.pdf).
 ///       Nuffield College, Oxford
 ///
 /// # Example
 /// ```
 /// use rand::prelude::*;
 /// use rand_distr::Exp1;
 ///
 /// let val: f64 = thread_rng().sample(Exp1);
 /// println!("{}", val);
 /// ```
 #[derive(Clone, Copy, Debug)]
 pub struct Exp1;

 impl Distribution<f32> for Exp1 {
     #[inline]
     fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> f32 {
         // TODO: use optimal 32-bit implementation
         let x: f64 = self.sample(rng);
         x as f32
     }
 }

 // This could be done via `-rng.gen::<f64>().ln()` but that is slower.
 impl Distribution<f64> for Exp1 {
     #[inline]
     fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> f64 {
         #[inline]
         fn pdf(x: f64) -> f64 {
             (-x).exp()
         }
         #[inline]
         fn zero_case<R: Rng + ?Sized>(rng: &mut R, _u: f64) -> f64 {
             ziggurat_tables::ZIG_EXP_R - rng.gen::<f64>().ln()
         }

         ziggurat(
             rng,
             false,
             &ziggurat_tables::ZIG_EXP_X,
             &ziggurat_tables::ZIG_EXP_F,
             pdf,
             zero_case,
         )
     }
 }

 /// The exponential distribution `Exp(lambda)`.
 ///
 /// This distribution has density function: `f(x) = lambda * exp(-lambda * x)`
 /// for `x > 0`, when `lambda > 0`. For `lambda = 0`, all samples yield infinity.
 ///
 /// Note that [`Exp1`](crate::Exp1) is an optimised implementation for `lambda = 1`.
 ///
 /// # Example
 ///
 /// ```
 /// use rand_distr::{Exp, Distribution};
 ///
 /// let exp = Exp::new(2.0).unwrap();
 /// let v = exp.sample(&mut rand::thread_rng());
 /// println!("{} is from a Exp(2) distribution", v);
 /// ```
 #[derive(Clone, Copy, Debug)]
 pub struct Exp<F>
 where F: Float, Exp1: Distribution<F>
 {
     /// `lambda` stored as `1/lambda`, since this is what we scale by.
     lambda_inverse: F,
 }

 /// Error type returned from `Exp::new`.
 #[derive(Clone, Copy, Debug, PartialEq, Eq)]
 pub enum Error {
     /// `lambda < 0` or `nan`.
     LambdaTooSmall,
 }

 impl fmt::Display for Error {
     fn fmt(&self, f: &mut fmt::Formatter<'_>) -> fmt::Result {
         f.write_str(match self {
             Error::LambdaTooSmall => "lambda is negative or NaN in exponential distribution",
         })
     }
 }

 #[cfg(feature = "std")]
 impl std::error::Error for Error {}

 impl<F: Float> Exp<F>
 where F: Float, Exp1: Distribution<F>
 {
     /// Construct a new `Exp` with the given shape parameter
     /// `lambda`.
     ///
     /// # Remarks
     ///
     /// For custom types `N` implementing the [`Float`](crate::Float) trait,
     /// the case `lambda = 0` is handled as follows: each sample corresponds
     /// to a sample from an `Exp1` multiplied by `1 / 0`. Primitive types
     /// yield infinity, since `1 / 0 = infinity`.
     #[inline]
     pub fn new(lambda: F) -> Result<Exp<F>, Error> {
         if !(lambda >= F::zero()) {
             return Err(Error::LambdaTooSmall);
         }
         Ok(Exp {
             lambda_inverse: F::one() / lambda,
         })
     }
 }

 impl<F> Distribution<F> for Exp<F>
 where F: Float, Exp1: Distribution<F>
 {
     fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> F {
         rng.sample(Exp1) * self.lambda_inverse
     }
 }

 #[cfg(test)]
 mod test {
     use super::*;

     #[test]
     fn test_exp() {
         let exp = Exp::new(10.0).unwrap();
         let mut rng = crate::test::rng(221);
         for _ in 0..1000 {
             assert!(exp.sample(&mut rng) >= 0.0);
         }
     }
     #[test]
     fn test_zero() {
         let d = Exp::new(0.0).unwrap();
         assert_eq!(d.sample(&mut crate::test::rng(21)), f64::infinity());
     }
     #[test]
     #[should_panic]
     fn test_exp_invalid_lambda_neg() {
         Exp::new(-10.0).unwrap();
     }

     #[test]
     #[should_panic]
     fn test_exp_invalid_lambda_nan() {
         Exp::new(f64::nan()).unwrap();
     }
 }
	// Copyright 2018 Developers of the Rand project.
	// Copyright 2013 The Rust Project Developers.
	//
	// Licensed under the Apache License, Version 2.0 <LICENSE-APACHE or
	// https://www.apache.org/licenses/LICENSE-2.0> or the MIT license
	// <LICENSE-MIT or https://opensource.org/licenses/MIT>, at your
	// option. This file may not be copied, modified, or distributed
	// except according to those terms.

	//! The exponential distribution.

	use crate::utils::ziggurat;
	use num_traits::Float;
	use crate::{ziggurat_tables, Distribution};
	use rand::Rng;
	use core::fmt;

	/// Samples floating-point numbers according to the exponential distribution,
	/// with rate parameter `λ = 1`. This is equivalent to `Exp::new(1.0)` or
	/// sampling with `-rng.gen::<f64>().ln()`, but faster.
	///
	/// See `Exp` for the general exponential distribution.
	///
	/// Implemented via the ZIGNOR variant[^1] of the Ziggurat method. The exact
	/// description in the paper was adjusted to use tables for the exponential
	/// distribution rather than normal.
	///
	/// [^1]: Jurgen A. Doornik (2005). [*An Improved Ziggurat Method to
	/// Generate Normal Random Samples*](
	/// https://www.doornik.com/research/ziggurat.pdf).
	/// Nuffield College, Oxford
	///
	/// # Example
	/// ```
	/// use rand::prelude::*;
	/// use rand_distr::Exp1;
	///
	/// let val: f64 = thread_rng().sample(Exp1);
	/// println!("{}", val);
	/// ```
	#[derive(Clone, Copy, Debug)]
	pub struct Exp1;

	impl Distribution<f32> for Exp1 {
	#[inline]
	fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> f32 {
	// TODO: use optimal 32-bit implementation
	let x: f64 = self.sample(rng);
	x as f32
	}
	}

	// This could be done via `-rng.gen::<f64>().ln()` but that is slower.
	impl Distribution<f64> for Exp1 {
	#[inline]
	fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> f64 {
	#[inline]
	fn pdf(x: f64) -> f64 {
	(-x).exp()
	}
	#[inline]
	fn zero_case<R: Rng + ?Sized>(rng: &mut R, _u: f64) -> f64 {
	ziggurat_tables::ZIG_EXP_R - rng.gen::<f64>().ln()
	}

	ziggurat(
	rng,
	false,
	&ziggurat_tables::ZIG_EXP_X,
	&ziggurat_tables::ZIG_EXP_F,
	pdf,
	zero_case,
	)
	}
	}

	/// The exponential distribution `Exp(lambda)`.
	///
	/// This distribution has density function: `f(x) = lambda * exp(-lambda * x)`
	/// for `x > 0`, when `lambda > 0`. For `lambda = 0`, all samples yield infinity.
	///
	/// Note that [`Exp1`](crate::Exp1) is an optimised implementation for `lambda = 1`.
	///
	/// # Example
	///
	/// ```
	/// use rand_distr::{Exp, Distribution};
	///
	/// let exp = Exp::new(2.0).unwrap();
	/// let v = exp.sample(&mut rand::thread_rng());
	/// println!("{} is from a Exp(2) distribution", v);
	/// ```
	#[derive(Clone, Copy, Debug)]
	pub struct Exp<F>
	where F: Float, Exp1: Distribution<F>
	{
	/// `lambda` stored as `1/lambda`, since this is what we scale by.
	lambda_inverse: F,
	}

	/// Error type returned from `Exp::new`.
	#[derive(Clone, Copy, Debug, PartialEq, Eq)]
	pub enum Error {
	/// `lambda < 0` or `nan`.
	LambdaTooSmall,
	}

	impl fmt::Display for Error {
	fn fmt(&self, f: &mut fmt::Formatter<'_>) -> fmt::Result {
	f.write_str(match self {
	Error::LambdaTooSmall => "lambda is negative or NaN in exponential distribution",
	})
	}
	}

	#[cfg(feature = "std")]
	impl std::error::Error for Error {}

	impl<F: Float> Exp<F>
	where F: Float, Exp1: Distribution<F>
	{
	/// Construct a new `Exp` with the given shape parameter
	/// `lambda`.
	///
	/// # Remarks
	///
	/// For custom types `N` implementing the [`Float`](crate::Float) trait,
	/// the case `lambda = 0` is handled as follows: each sample corresponds
	/// to a sample from an `Exp1` multiplied by `1 / 0`. Primitive types
	/// yield infinity, since `1 / 0 = infinity`.
	#[inline]
	pub fn new(lambda: F) -> Result<Exp<F>, Error> {
	if !(lambda >= F::zero()) {
	return Err(Error::LambdaTooSmall);
	}
	Ok(Exp {
	lambda_inverse: F::one() / lambda,
	})
	}
	}

	impl<F> Distribution<F> for Exp<F>
	where F: Float, Exp1: Distribution<F>
	{
	fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> F {
	rng.sample(Exp1) * self.lambda_inverse
	}
	}

	#[cfg(test)]
	mod test {
	use super::*;

	#[test]
	fn test_exp() {
	let exp = Exp::new(10.0).unwrap();
	let mut rng = crate::test::rng(221);
	for _ in 0..1000 {
	assert!(exp.sample(&mut rng) >= 0.0);
	}
	}
	#[test]
	fn test_zero() {
	let d = Exp::new(0.0).unwrap();
	assert_eq!(d.sample(&mut crate::test::rng(21)), f64::infinity());
	}
	#[test]
	#[should_panic]
	fn test_exp_invalid_lambda_neg() {
	Exp::new(-10.0).unwrap();
	}

	#[test]
	#[should_panic]
	fn test_exp_invalid_lambda_nan() {
	Exp::new(f64::nan()).unwrap();
	}
	}