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178 lines
5.6 KiB
Plaintext
178 lines
5.6 KiB
Plaintext
[section:cf Continued Fraction Evaluation]
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[h4 Synopsis]
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``
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#include <boost/math/tools/fraction.hpp>
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``
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namespace boost{ namespace math{ namespace tools{
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template <class Gen, class U>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_b(Gen& g, const U& tolerance, boost::uintmax_t& max_terms)
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template <class Gen, class U>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_b(Gen& g, const U& tolerance)
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template <class Gen, class U>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_a(Gen& g, const U& tolerance, boost::uintmax_t& max_terms)
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template <class Gen, class U>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_a(Gen& g, const U& tolerance)
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//
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// These interfaces are present for legacy reasons, and are now deprecated:
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//
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template <class Gen>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_b(Gen& g, int bits);
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template <class Gen>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_b(Gen& g, int bits, boost::uintmax_t& max_terms);
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template <class Gen>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_a(Gen& g, int bits);
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template <class Gen>
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typename detail::fraction_traits<Gen>::result_type
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continued_fraction_a(Gen& g, int bits, boost::uintmax_t& max_terms);
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}}} // namespaces
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[h4 Description]
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[@http://en.wikipedia.org/wiki/Continued_fraction Continued fractions are a common method of approximation. ]
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These functions all evaluate the continued fraction described by the /generator/
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type argument. The functions with an "_a" suffix evaluate the fraction:
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[equation fraction2]
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and those with a "_b" suffix evaluate the fraction:
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[equation fraction1]
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This latter form is somewhat more natural in that it corresponds with the usual
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definition of a continued fraction, but note that the first /a/ value returned by
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the generator is discarded. Further, often the first /a/ and /b/ values in a
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continued fraction have different defining equations to the remaining terms, which
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may make the "_a" suffixed form more appropriate.
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The generator type should be a function object which supports the following
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operations:
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[table
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[[Expression] [Description]]
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[[Gen::result_type] [The type that is the result of invoking operator().
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This can be either an arithmetic type, or a std::pair<> of arithmetic types.]]
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[[g()] [Returns an object of type Gen::result_type.
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Each time this operator is called then the next pair of /a/ and /b/
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values is returned. Or, if result_type is an arithmetic type,
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then the next /b/ value is returned and all the /a/ values
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are assumed to 1.]]
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]
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In all the continued fraction evaluation functions the /tolerance/ parameter is the
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precision desired in the result, evaluation of the fraction will
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continue until the last term evaluated leaves the relative error in the result
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less than /tolerance/. The deprecated interfaces take a number of digits precision
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here, internally they just convert this to a tolerance and forward call.
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If the optional /max_terms/ parameter is specified then no more than /max_terms/
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calls to the generator will be made, and on output,
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/max_terms/ will be set to actual number of
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calls made. This facility is particularly useful when profiling a continued
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fraction for convergence.
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[h4 Implementation]
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Internally these algorithms all use the modified Lentz algorithm: refer to
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Numeric Recipes in C++, W. H. Press et all, chapter 5,
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(especially 5.2 Evaluation of continued fractions, p 175 - 179)
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for more information, also
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Lentz, W.J. 1976, Applied Optics, vol. 15, pp. 668-671.
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[h4 Examples]
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The [@http://en.wikipedia.org/wiki/Golden_ratio golden ratio phi = 1.618033989...]
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can be computed from the simplest continued fraction of all:
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[equation fraction3]
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We begin by defining a generator function:
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template <class T>
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struct golden_ratio_fraction
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{
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typedef T result_type;
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result_type operator()
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{
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return 1;
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}
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};
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The golden ratio can then be computed to double precision using:
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continued_fraction_a(
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golden_ratio_fraction<double>(),
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std::numeric_limits<double>::epsilon());
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It's more usual though to have to define both the /a/'s and the /b/'s
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when evaluating special functions by continued fractions, for example
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the tan function is defined by:
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[equation fraction4]
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So its generator object would look like:
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template <class T>
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struct tan_fraction
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{
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private:
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T a, b;
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public:
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tan_fraction(T v)
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: a(-v*v), b(-1)
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{}
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typedef std::pair<T,T> result_type;
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std::pair<T,T> operator()()
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{
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b += 2;
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return std::make_pair(a, b);
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}
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};
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Notice that if the continuant is subtracted from the /b/ terms,
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as is the case here, then all the /a/ terms returned by the generator
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will be negative. The tangent function can now be evaluated using:
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template <class T>
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T tan(T a)
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{
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tan_fraction<T> fract(a);
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return a / continued_fraction_b(fract, std::numeric_limits<T>::epsilon());
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}
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Notice that this time we're using the "_b" suffixed version to evaluate
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the fraction: we're removing the leading /a/ term during fraction evaluation
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as it's different from all the others.
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[endsect][/section:cf Continued Fraction Evaluation]
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[/
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Copyright 2006 John Maddock and Paul A. Bristow.
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Distributed under the Boost Software License, Version 1.0.
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(See accompanying file LICENSE_1_0.txt or copy at
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http://www.boost.org/LICENSE_1_0.txt).
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]
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