// boost\math\distributions\poisson.hpp // Copyright John Maddock 2006. // Copyright Paul A. Bristow 2007. // Use, modification and distribution are subject to the // Boost Software License, Version 1.0. // (See accompanying file LICENSE_1_0.txt // or copy at http://www.boost.org/LICENSE_1_0.txt) // Poisson distribution is a discrete probability distribution. // It expresses the probability of a number (k) of // events, occurrences, failures or arrivals occurring in a fixed time, // assuming these events occur with a known average or mean rate (lambda) // and are independent of the time since the last event. // The distribution was discovered by Simeon-Denis Poisson (1781-1840). // Parameter lambda is the mean number of events in the given time interval. // The random variate k is the number of events, occurrences or arrivals. // k argument may be integral, signed, or unsigned, or floating point. // If necessary, it has already been promoted from an integral type. // Note that the Poisson distribution // (like others including the binomial, negative binomial & Bernoulli) // is strictly defined as a discrete function: // only integral values of k are envisaged. // However because the method of calculation uses a continuous gamma function, // it is convenient to treat it as if a continous function, // and permit non-integral values of k. // To enforce the strict mathematical model, users should use floor or ceil functions // on k outside this function to ensure that k is integral. // See http://en.wikipedia.org/wiki/Poisson_distribution // http://documents.wolfram.com/v5/Add-onsLinks/StandardPackages/Statistics/DiscreteDistributions.html #ifndef BOOST_MATH_SPECIAL_POISSON_HPP #define BOOST_MATH_SPECIAL_POISSON_HPP #include #include // for incomplete gamma. gamma_q #include // for incomplete gamma. gamma_q #include // complements #include // error checks #include // isnan. #include // factorials. #include // for root finding. #include #include namespace boost { namespace math { namespace poisson_detail { // Common error checking routines for Poisson distribution functions. // These are convoluted, & apparently redundant, to try to ensure that // checks are always performed, even if exceptions are not enabled. template inline bool check_mean(const char* function, const RealType& mean, RealType* result, const Policy& pol) { if(!(boost::math::isfinite)(mean) || (mean < 0)) { *result = policies::raise_domain_error( function, "Mean argument is %1%, but must be >= 0 !", mean, pol); return false; } return true; } // bool check_mean template inline bool check_mean_NZ(const char* function, const RealType& mean, RealType* result, const Policy& pol) { // mean == 0 is considered an error. if( !(boost::math::isfinite)(mean) || (mean <= 0)) { *result = policies::raise_domain_error( function, "Mean argument is %1%, but must be > 0 !", mean, pol); return false; } return true; } // bool check_mean_NZ template inline bool check_dist(const char* function, const RealType& mean, RealType* result, const Policy& pol) { // Only one check, so this is redundant really but should be optimized away. return check_mean_NZ(function, mean, result, pol); } // bool check_dist template inline bool check_k(const char* function, const RealType& k, RealType* result, const Policy& pol) { if((k < 0) || !(boost::math::isfinite)(k)) { *result = policies::raise_domain_error( function, "Number of events k argument is %1%, but must be >= 0 !", k, pol); return false; } return true; } // bool check_k template inline bool check_dist_and_k(const char* function, RealType mean, RealType k, RealType* result, const Policy& pol) { if((check_dist(function, mean, result, pol) == false) || (check_k(function, k, result, pol) == false)) { return false; } return true; } // bool check_dist_and_k template inline bool check_prob(const char* function, const RealType& p, RealType* result, const Policy& pol) { // Check 0 <= p <= 1 if(!(boost::math::isfinite)(p) || (p < 0) || (p > 1)) { *result = policies::raise_domain_error( function, "Probability argument is %1%, but must be >= 0 and <= 1 !", p, pol); return false; } return true; } // bool check_prob template inline bool check_dist_and_prob(const char* function, RealType mean, RealType p, RealType* result, const Policy& pol) { if((check_dist(function, mean, result, pol) == false) || (check_prob(function, p, result, pol) == false)) { return false; } return true; } // bool check_dist_and_prob } // namespace poisson_detail template > class poisson_distribution { public: typedef RealType value_type; typedef Policy policy_type; poisson_distribution(RealType l_mean = 1) : m_l(l_mean) // mean (lambda). { // Expected mean number of events that occur during the given interval. RealType r; poisson_detail::check_dist( "boost::math::poisson_distribution<%1%>::poisson_distribution", m_l, &r, Policy()); } // poisson_distribution constructor. RealType mean() const { // Private data getter function. return m_l; } private: // Data member, initialized by constructor. RealType m_l; // mean number of occurrences. }; // template class poisson_distribution typedef poisson_distribution poisson; // Reserved name of type double. // Non-member functions to give properties of the distribution. template inline const std::pair range(const poisson_distribution& /* dist */) { // Range of permissible values for random variable k. using boost::math::tools::max_value; return std::pair(static_cast(0), max_value()); // Max integer? } template inline const std::pair support(const poisson_distribution& /* dist */) { // Range of supported values for random variable k. // This is range where cdf rises from 0 to 1, and outside it, the pdf is zero. using boost::math::tools::max_value; return std::pair(static_cast(0), max_value()); } template inline RealType mean(const poisson_distribution& dist) { // Mean of poisson distribution = lambda. return dist.mean(); } // mean template inline RealType mode(const poisson_distribution& dist) { // mode. BOOST_MATH_STD_USING // ADL of std functions. return floor(dist.mean()); } //template //inline RealType median(const poisson_distribution& dist) //{ // median = approximately lambda + 1/3 - 0.2/lambda // RealType l = dist.mean(); // return dist.mean() + static_cast(0.3333333333333333333333333333333333333333333333) // - static_cast(0.2) / l; //} // BUT this formula appears to be out-by-one compared to quantile(half) // Query posted on Wikipedia. // Now implemented via quantile(half) in derived accessors. template inline RealType variance(const poisson_distribution& dist) { // variance. return dist.mean(); } // RealType standard_deviation(const poisson_distribution& dist) // standard_deviation provided by derived accessors. template inline RealType skewness(const poisson_distribution& dist) { // skewness = sqrt(l). BOOST_MATH_STD_USING // ADL of std functions. return 1 / sqrt(dist.mean()); } template inline RealType kurtosis_excess(const poisson_distribution& dist) { // skewness = sqrt(l). return 1 / dist.mean(); // kurtosis_excess 1/mean from Wiki & MathWorld eq 31. // http://mathworld.wolfram.com/Kurtosis.html explains that the kurtosis excess // is more convenient because the kurtosis excess of a normal distribution is zero // whereas the true kurtosis is 3. } // RealType kurtosis_excess template inline RealType kurtosis(const poisson_distribution& dist) { // kurtosis is 4th moment about the mean = u4 / sd ^ 4 // http://en.wikipedia.org/wiki/Curtosis // kurtosis can range from -2 (flat top) to +infinity (sharp peak & heavy tails). // http://www.itl.nist.gov/div898/handbook/eda/section3/eda35b.htm return 3 + 1 / dist.mean(); // NIST. // http://mathworld.wolfram.com/Kurtosis.html explains that the kurtosis excess // is more convenient because the kurtosis excess of a normal distribution is zero // whereas the true kurtosis is 3. } // RealType kurtosis template RealType pdf(const poisson_distribution& dist, const RealType& k) { // Probability Density/Mass Function. // Probability that there are EXACTLY k occurrences (or arrivals). BOOST_FPU_EXCEPTION_GUARD BOOST_MATH_STD_USING // for ADL of std functions. RealType mean = dist.mean(); // Error check: RealType result = 0; if(false == poisson_detail::check_dist_and_k( "boost::math::pdf(const poisson_distribution<%1%>&, %1%)", mean, k, &result, Policy())) { return result; } // Special case of mean zero, regardless of the number of events k. if (mean == 0) { // Probability for any k is zero. return 0; } if (k == 0) { // mean ^ k = 1, and k! = 1, so can simplify. return exp(-mean); } return boost::math::gamma_p_derivative(k+1, mean, Policy()); } // pdf template RealType cdf(const poisson_distribution& dist, const RealType& k) { // Cumulative Distribution Function Poisson. // The random variate k is the number of occurrences(or arrivals) // k argument may be integral, signed, or unsigned, or floating point. // If necessary, it has already been promoted from an integral type. // Returns the sum of the terms 0 through k of the Poisson Probability Density or Mass (pdf). // But note that the Poisson distribution // (like others including the binomial, negative binomial & Bernoulli) // is strictly defined as a discrete function: only integral values of k are envisaged. // However because of the method of calculation using a continuous gamma function, // it is convenient to treat it as if it is a continous function // and permit non-integral values of k. // To enforce the strict mathematical model, users should use floor or ceil functions // outside this function to ensure that k is integral. // The terms are not summed directly (at least for larger k) // instead the incomplete gamma integral is employed, BOOST_MATH_STD_USING // for ADL of std function exp. RealType mean = dist.mean(); // Error checks: RealType result = 0; if(false == poisson_detail::check_dist_and_k( "boost::math::cdf(const poisson_distribution<%1%>&, %1%)", mean, k, &result, Policy())) { return result; } // Special cases: if (mean == 0) { // Probability for any k is zero. return 0; } if (k == 0) { // return pdf(dist, static_cast(0)); // but mean (and k) have already been checked, // so this avoids unnecessary repeated checks. return exp(-mean); } // For small integral k could use a finite sum - // it's cheaper than the gamma function. // BUT this is now done efficiently by gamma_q function. // Calculate poisson cdf using the gamma_q function. return gamma_q(k+1, mean, Policy()); } // binomial cdf template RealType cdf(const complemented2_type, RealType>& c) { // Complemented Cumulative Distribution Function Poisson // The random variate k is the number of events, occurrences or arrivals. // k argument may be integral, signed, or unsigned, or floating point. // If necessary, it has already been promoted from an integral type. // But note that the Poisson distribution // (like others including the binomial, negative binomial & Bernoulli) // is strictly defined as a discrete function: only integral values of k are envisaged. // However because of the method of calculation using a continuous gamma function, // it is convenient to treat it as is it is a continous function // and permit non-integral values of k. // To enforce the strict mathematical model, users should use floor or ceil functions // outside this function to ensure that k is integral. // Returns the sum of the terms k+1 through inf of the Poisson Probability Density/Mass (pdf). // The terms are not summed directly (at least for larger k) // instead the incomplete gamma integral is employed, RealType const& k = c.param; poisson_distribution const& dist = c.dist; RealType mean = dist.mean(); // Error checks: RealType result = 0; if(false == poisson_detail::check_dist_and_k( "boost::math::cdf(const poisson_distribution<%1%>&, %1%)", mean, k, &result, Policy())) { return result; } // Special case of mean, regardless of the number of events k. if (mean == 0) { // Probability for any k is unity, complement of zero. return 1; } if (k == 0) { // Avoid repeated checks on k and mean in gamma_p. return -boost::math::expm1(-mean, Policy()); } // Unlike un-complemented cdf (sum from 0 to k), // can't use finite sum from k+1 to infinity for small integral k, // anyway it is now done efficiently by gamma_p. return gamma_p(k + 1, mean, Policy()); // Calculate Poisson cdf using the gamma_p function. // CCDF = gamma_p(k+1, lambda) } // poisson ccdf template inline RealType quantile(const poisson_distribution& dist, const RealType& p) { // Quantile (or Percent Point) Poisson function. // Return the number of expected events k for a given probability p. static const char* function = "boost::math::quantile(const poisson_distribution<%1%>&, %1%)"; RealType result = 0; // of Argument checks: if(false == poisson_detail::check_prob( function, p, &result, Policy())) { return result; } // Special case: if (dist.mean() == 0) { // if mean = 0 then p = 0, so k can be anything? if (false == poisson_detail::check_mean_NZ( function, dist.mean(), &result, Policy())) { return result; } } if(p == 0) { return 0; // Exact result regardless of discrete-quantile Policy } if(p == 1) { return policies::raise_overflow_error(function, 0, Policy()); } typedef typename Policy::discrete_quantile_type discrete_type; boost::uintmax_t max_iter = policies::get_max_root_iterations(); RealType guess, factor = 8; RealType z = dist.mean(); if(z < 1) guess = z; else guess = boost::math::detail::inverse_poisson_cornish_fisher(z, p, RealType(1-p), Policy()); if(z > 5) { if(z > 1000) factor = 1.01f; else if(z > 50) factor = 1.1f; else if(guess > 10) factor = 1.25f; else factor = 2; if(guess < 1.1) factor = 8; } return detail::inverse_discrete_quantile( dist, p, false, guess, factor, RealType(1), discrete_type(), max_iter); } // quantile template inline RealType quantile(const complemented2_type, RealType>& c) { // Quantile (or Percent Point) of Poisson function. // Return the number of expected events k for a given // complement of the probability q. // // Error checks: static const char* function = "boost::math::quantile(complement(const poisson_distribution<%1%>&, %1%))"; RealType q = c.param; const poisson_distribution& dist = c.dist; RealType result = 0; // of argument checks. if(false == poisson_detail::check_prob( function, q, &result, Policy())) { return result; } // Special case: if (dist.mean() == 0) { // if mean = 0 then p = 0, so k can be anything? if (false == poisson_detail::check_mean_NZ( function, dist.mean(), &result, Policy())) { return result; } } if(q == 0) { return policies::raise_overflow_error(function, 0, Policy()); } if(q == 1) { return 0; // Exact result regardless of discrete-quantile Policy } typedef typename Policy::discrete_quantile_type discrete_type; boost::uintmax_t max_iter = policies::get_max_root_iterations(); RealType guess, factor = 8; RealType z = dist.mean(); if(z < 1) guess = z; else guess = boost::math::detail::inverse_poisson_cornish_fisher(z, RealType(1-q), q, Policy()); if(z > 5) { if(z > 1000) factor = 1.01f; else if(z > 50) factor = 1.1f; else if(guess > 10) factor = 1.25f; else factor = 2; if(guess < 1.1) factor = 8; } return detail::inverse_discrete_quantile( dist, q, true, guess, factor, RealType(1), discrete_type(), max_iter); } // quantile complement. } // namespace math } // namespace boost // This include must be at the end, *after* the accessors // for this distribution have been defined, in order to // keep compilers that support two-phase lookup happy. #include #include #endif // BOOST_MATH_SPECIAL_POISSON_HPP