/* boost random/inversive_congruential.hpp header file * * Copyright Jens Maurer 2000-2001 * Distributed under 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) * * See http://www.boost.org for most recent version including documentation. * * $Id: inversive_congruential.hpp 60755 2010-03-22 00:45:06Z steven_watanabe $ * * Revision history * 2001-02-18 moved to individual header files */ #ifndef BOOST_RANDOM_INVERSIVE_CONGRUENTIAL_HPP #define BOOST_RANDOM_INVERSIVE_CONGRUENTIAL_HPP #include #include #include #include #include #include #include namespace boost { namespace random { // Eichenauer and Lehn 1986 /** * Instantiations of class template @c inversive_congruential model a * \pseudo_random_number_generator. It uses the inversive congruential * algorithm (ICG) described in * * @blockquote * "Inversive pseudorandom number generators: concepts, results and links", * Peter Hellekalek, In: "Proceedings of the 1995 Winter Simulation * Conference", C. Alexopoulos, K. Kang, W.R. Lilegdon, and D. Goldsman * (editors), 1995, pp. 255-262. ftp://random.mat.sbg.ac.at/pub/data/wsc95.ps * @endblockquote * * The output sequence is defined by x(n+1) = (a*inv(x(n)) - b) (mod p), * where x(0), a, b, and the prime number p are parameters of the generator. * The expression inv(k) denotes the multiplicative inverse of k in the * field of integer numbers modulo p, with inv(0) := 0. * * The template parameter IntType shall denote a signed integral type large * enough to hold p; a, b, and p are the parameters of the generators. The * template parameter val is the validation value checked by validation. * * @xmlnote * The implementation currently uses the Euclidian Algorithm to compute * the multiplicative inverse. Therefore, the inversive generators are about * 10-20 times slower than the others (see section"performance"). However, * the paper talks of only 3x slowdown, so the Euclidian Algorithm is probably * not optimal for calculating the multiplicative inverse. * @endxmlnote */ template class inversive_congruential { public: typedef IntType result_type; #ifndef BOOST_NO_INCLASS_MEMBER_INITIALIZATION static const bool has_fixed_range = true; static const result_type min_value = (b == 0 ? 1 : 0); static const result_type max_value = p-1; #else BOOST_STATIC_CONSTANT(bool, has_fixed_range = false); #endif BOOST_STATIC_CONSTANT(result_type, multiplier = a); BOOST_STATIC_CONSTANT(result_type, increment = b); BOOST_STATIC_CONSTANT(result_type, modulus = p); result_type min BOOST_PREVENT_MACRO_SUBSTITUTION () const { return b == 0 ? 1 : 0; } result_type max BOOST_PREVENT_MACRO_SUBSTITUTION () const { return p-1; } /** * Constructs an inversive_congruential generator with * @c y0 as the initial state. */ explicit inversive_congruential(IntType y0 = 1) : value(y0) { BOOST_STATIC_ASSERT(b >= 0); BOOST_STATIC_ASSERT(p > 1); BOOST_STATIC_ASSERT(a >= 1); if(b == 0) assert(y0 > 0); } template inversive_congruential(It& first, It last) { seed(first, last); } /** Changes the current state to y0. */ void seed(IntType y0 = 1) { value = y0; if(b == 0) assert(y0 > 0); } template void seed(It& first, It last) { if(first == last) throw std::invalid_argument("inversive_congruential::seed"); value = *first++; } IntType operator()() { typedef const_mod do_mod; value = do_mod::mult_add(a, do_mod::invert(value), b); return value; } static bool validation(result_type x) { return val == x; } #ifndef BOOST_NO_OPERATORS_IN_NAMESPACE #ifndef BOOST_RANDOM_NO_STREAM_OPERATORS template friend std::basic_ostream& operator<<(std::basic_ostream& os, inversive_congruential x) { os << x.value; return os; } template friend std::basic_istream& operator>>(std::basic_istream& is, inversive_congruential& x) { is >> x.value; return is; } #endif friend bool operator==(inversive_congruential x, inversive_congruential y) { return x.value == y.value; } friend bool operator!=(inversive_congruential x, inversive_congruential y) { return !(x == y); } #else // Use a member function; Streamable concept not supported. bool operator==(inversive_congruential rhs) const { return value == rhs.value; } bool operator!=(inversive_congruential rhs) const { return !(*this == rhs); } #endif private: IntType value; }; #ifndef BOOST_NO_INCLASS_MEMBER_INITIALIZATION // A definition is required even for integral static constants template const bool inversive_congruential::has_fixed_range; template const typename inversive_congruential::result_type inversive_congruential::min_value; template const typename inversive_congruential::result_type inversive_congruential::max_value; template const typename inversive_congruential::result_type inversive_congruential::multiplier; template const typename inversive_congruential::result_type inversive_congruential::increment; template const typename inversive_congruential::result_type inversive_congruential::modulus; #endif } // namespace random /** * The specialization hellekalek1995 was suggested in * * @blockquote * "Inversive pseudorandom number generators: concepts, results and links", * Peter Hellekalek, In: "Proceedings of the 1995 Winter Simulation * Conference", C. Alexopoulos, K. Kang, W.R. Lilegdon, and D. Goldsman * (editors), 1995, pp. 255-262. ftp://random.mat.sbg.ac.at/pub/data/wsc95.ps * @endblockquote */ typedef random::inversive_congruential hellekalek1995; } // namespace boost #endif // BOOST_RANDOM_INVERSIVE_CONGRUENTIAL_HPP