// Copyright 2016-2017 The Rust Project Developers. See the COPYRIGHT
// file at the top-level directory of this distribution and at
// https://rust-lang.org/COPYRIGHT.
//
// 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 binomial distribution.

use Rng;
use distributions::{Distribution, Bernoulli, Cauchy};
use distributions::log_gamma::log_gamma;

/// The binomial distribution `Binomial(n, p)`.
///
/// This distribution has density function:
/// `f(k) = n!/(k! (n-k)!) p^k (1-p)^(n-k)` for `k >= 0`.
///
/// # Example
///
/// ```
/// use rand::distributions::{Binomial, Distribution};
///
/// let bin = Binomial::new(20, 0.3);
/// let v = bin.sample(&mut rand::thread_rng());
/// println!("{} is from a binomial distribution", v);
/// ```
#[derive(Clone, Copy, Debug)]
pub struct Binomial {
    /// Number of trials.
    n: u64,
    /// Probability of success.
    p: f64,
}

impl Binomial {
    /// Construct a new `Binomial` with the given shape parameters `n` (number
    /// of trials) and `p` (probability of success).
    ///
    /// Panics if `p < 0` or `p > 1`.
    pub fn new(n: u64, p: f64) -> Binomial {
        assert!(p >= 0.0, "Binomial::new called with p < 0");
        assert!(p <= 1.0, "Binomial::new called with p > 1");
        Binomial { n, p }
    }
}

impl Distribution<u64> for Binomial {
    fn sample<R: Rng + ?Sized>(&self, rng: &mut R) -> u64 {
        // Handle these values directly.
        if self.p == 0.0 {
            return 0;
        } else if self.p == 1.0 {
            return self.n;
        }
        
        // For low n, it is faster to sample directly. For both methods,
        // performance is independent of p. On Intel Haswell CPU this method
        // appears to be faster for approx n < 300.
        if self.n < 300 {
            let mut result = 0;
            let d = Bernoulli::new(self.p);
            for _ in 0 .. self.n {
                result += rng.sample(d) as u32;
            }
            return result as u64;
        }
        
        // binomial distribution is symmetrical with respect to p -> 1-p, k -> n-k
        // switch p so that it is less than 0.5 - this allows for lower expected values
        // we will just invert the result at the end
        let p = if self.p <= 0.5 {
            self.p
        } else {
            1.0 - self.p
        };

        // prepare some cached values
        let float_n = self.n as f64;
        let ln_fact_n = log_gamma(float_n + 1.0);
        let pc = 1.0 - p;
        let log_p = p.ln();
        let log_pc = pc.ln();
        let expected = self.n as f64 * p;
        let sq = (expected * (2.0 * pc)).sqrt();

        let mut lresult;

        // we use the Cauchy distribution as the comparison distribution
        // f(x) ~ 1/(1+x^2)
        let cauchy = Cauchy::new(0.0, 1.0);
        loop {
            let mut comp_dev: f64;
            loop {
                // draw from the Cauchy distribution
                comp_dev = rng.sample(cauchy);
                // shift the peak of the comparison ditribution
                lresult = expected + sq * comp_dev;
                // repeat the drawing until we are in the range of possible values
                if lresult >= 0.0 && lresult < float_n + 1.0 {
                    break;
                }
            }

            // the result should be discrete
            lresult = lresult.floor();

            let log_binomial_dist = ln_fact_n - log_gamma(lresult+1.0) -
                log_gamma(float_n - lresult + 1.0) + lresult*log_p + (float_n - lresult)*log_pc;
            // this is the binomial probability divided by the comparison probability
            // we will generate a uniform random value and if it is larger than this,
            // we interpret it as a value falling out of the distribution and repeat
            let comparison_coeff = (log_binomial_dist.exp() * sq) * (1.2 * (1.0 + comp_dev*comp_dev));

            if comparison_coeff >= rng.gen() {
                break;
            }
        }

        // invert the result for p < 0.5
        if p != self.p {
            self.n - lresult as u64
        } else {
            lresult as u64
        }
    }
}

#[cfg(test)]
mod test {
    use Rng;
    use distributions::Distribution;
    use super::Binomial;

    fn test_binomial_mean_and_variance<R: Rng>(n: u64, p: f64, rng: &mut R) {
        let binomial = Binomial::new(n, p);

        let expected_mean = n as f64 * p;
        let expected_variance = n as f64 * p * (1.0 - p);

        let mut results = [0.0; 1000];
        for i in results.iter_mut() { *i = binomial.sample(rng) as f64; }

        let mean = results.iter().sum::<f64>() / results.len() as f64;
        assert!((mean as f64 - expected_mean).abs() < expected_mean / 50.0);

        let variance =
            results.iter().map(|x| (x - mean) * (x - mean)).sum::<f64>()
            / results.len() as f64;
        assert!((variance - expected_variance).abs() < expected_variance / 10.0);
    }

    #[test]
    fn test_binomial() {
        let mut rng = ::test::rng(351);
        test_binomial_mean_and_variance(150, 0.1, &mut rng);
        test_binomial_mean_and_variance(70, 0.6, &mut rng);
        test_binomial_mean_and_variance(40, 0.5, &mut rng);
        test_binomial_mean_and_variance(20, 0.7, &mut rng);
        test_binomial_mean_and_variance(20, 0.5, &mut rng);
    }

    #[test]
    fn test_binomial_end_points() {
        let mut rng = ::test::rng(352);
        assert_eq!(rng.sample(Binomial::new(20, 0.0)), 0);
        assert_eq!(rng.sample(Binomial::new(20, 1.0)), 20);
    }

    #[test]
    #[should_panic]
    fn test_binomial_invalid_lambda_neg() {
        Binomial::new(20, -10.0);
    }
}