src/third_party/ffmpeg_includes/ffmpeg.58.35.100/libavutil/rational.h - cobalt - Git at Google

 /*
  * rational numbers
  * Copyright (c) 2003 Michael Niedermayer <michaelni@gmx.at>
  *
  * This file is part of FFmpeg.
  *
  * FFmpeg is free software; you can redistribute it and/or
  * modify it under the terms of the GNU Lesser General Public
  * License as published by the Free Software Foundation; either
  * version 2.1 of the License, or (at your option) any later version.
  *
  * FFmpeg is distributed in the hope that it will be useful,
  * but WITHOUT ANY WARRANTY; without even the implied warranty of
  * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
  * Lesser General Public License for more details.
  *
  * You should have received a copy of the GNU Lesser General Public
  * License along with FFmpeg; if not, write to the Free Software
  * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
  */

 /**
  * @file
  * @ingroup lavu_math_rational
  * Utilties for rational number calculation.
  * @author Michael Niedermayer <michaelni@gmx.at>
  */

 #ifndef AVUTIL_RATIONAL_H
 #define AVUTIL_RATIONAL_H

 #include <stdint.h>
 #include <limits.h>
 #include "attributes.h"

 /**
  * @defgroup lavu_math_rational AVRational
  * @ingroup lavu_math
  * Rational number calculation.
  *
  * While rational numbers can be expressed as floating-point numbers, the
  * conversion process is a lossy one, so are floating-point operations. On the
  * other hand, the nature of FFmpeg demands highly accurate calculation of
  * timestamps. This set of rational number utilities serves as a generic
  * interface for manipulating rational numbers as pairs of numerators and
  * denominators.
  *
  * Many of the functions that operate on AVRational's have the suffix `_q`, in
  * reference to the mathematical symbol "ℚ" (Q) which denotes the set of all
  * rational numbers.
  *
  * @{
  */

 /**
  * Rational number (pair of numerator and denominator).
  */
 typedef struct AVRational{
     int num; ///< Numerator
     int den; ///< Denominator
 } AVRational;

 /**
  * Create an AVRational.
  *
  * Useful for compilers that do not support compound literals.
  *
  * @note The return value is not reduced.
  * @see av_reduce()
  */
 static inline AVRational av_make_q(int num, int den)
 {
     AVRational r = { num, den };
     return r;
 }

 /**
  * Compare two rationals.
  *
  * @param a First rational
  * @param b Second rational
  *
  * @return One of the following values:
  *         - 0 if `a == b`
  *         - 1 if `a > b`
  *         - -1 if `a < b`
  *         - `INT_MIN` if one of the values is of the form `0 / 0`
  */
 static inline int av_cmp_q(AVRational a, AVRational b){
     const int64_t tmp= a.num * (int64_t)b.den - b.num * (int64_t)a.den;

     if(tmp) return (int)((tmp ^ a.den ^ b.den)>>63)|1;
     else if(b.den && a.den) return 0;
     else if(a.num && b.num) return (a.num>>31) - (b.num>>31);
     else                    return INT_MIN;
 }

 /**
  * Convert an AVRational to a `double`.
  * @param a AVRational to convert
  * @return `a` in floating-point form
  * @see av_d2q()
  */
 static inline double av_q2d(AVRational a){
     return a.num / (double) a.den;
 }

 /**
  * Reduce a fraction.
  *
  * This is useful for framerate calculations.
  *
  * @param[out] dst_num Destination numerator
  * @param[out] dst_den Destination denominator
  * @param[in]      num Source numerator
  * @param[in]      den Source denominator
  * @param[in]      max Maximum allowed values for `dst_num` & `dst_den`
  * @return 1 if the operation is exact, 0 otherwise
  */
 int av_reduce(int *dst_num, int *dst_den, int64_t num, int64_t den, int64_t max);

 /**
  * Multiply two rationals.
  * @param b First rational
  * @param c Second rational
  * @return b*c
  */
 AVRational av_mul_q(AVRational b, AVRational c) av_const;

 /**
  * Divide one rational by another.
  * @param b First rational
  * @param c Second rational
  * @return b/c
  */
 AVRational av_div_q(AVRational b, AVRational c) av_const;

 /**
  * Add two rationals.
  * @param b First rational
  * @param c Second rational
  * @return b+c
  */
 AVRational av_add_q(AVRational b, AVRational c) av_const;

 /**
  * Subtract one rational from another.
  * @param b First rational
  * @param c Second rational
  * @return b-c
  */
 AVRational av_sub_q(AVRational b, AVRational c) av_const;

 /**
  * Invert a rational.
  * @param q value
  * @return 1 / q
  */
 static av_always_inline AVRational av_inv_q(AVRational q)
 {
     AVRational r = { q.den, q.num };
     return r;
 }

 /**
  * Convert a double precision floating point number to a rational.
  *
  * In case of infinity, the returned value is expressed as `{1, 0}` or
  * `{-1, 0}` depending on the sign.
  *
  * @param d   `double` to convert
  * @param max Maximum allowed numerator and denominator
  * @return `d` in AVRational form
  * @see av_q2d()
  */
 AVRational av_d2q(double d, int max) av_const;

 /**
  * Find which of the two rationals is closer to another rational.
  *
  * @param q     Rational to be compared against
  * @param q1,q2 Rationals to be tested
  * @return One of the following values:
  *         - 1 if `q1` is nearer to `q` than `q2`
  *         - -1 if `q2` is nearer to `q` than `q1`
  *         - 0 if they have the same distance
  */
 int av_nearer_q(AVRational q, AVRational q1, AVRational q2);

 /**
  * Find the value in a list of rationals nearest a given reference rational.
  *
  * @param q      Reference rational
  * @param q_list Array of rationals terminated by `{0, 0}`
  * @return Index of the nearest value found in the array
  */
 int av_find_nearest_q_idx(AVRational q, const AVRational* q_list);

 /**
  * Convert an AVRational to a IEEE 32-bit `float` expressed in fixed-point
  * format.
  *
  * @param q Rational to be converted
  * @return Equivalent floating-point value, expressed as an unsigned 32-bit
  *         integer.
  * @note The returned value is platform-indepedant.
  */
 uint32_t av_q2intfloat(AVRational q);

 /**
  * @}
  */

 #endif /* AVUTIL_RATIONAL_H */
	/*
	* rational numbers
	* Copyright (c) 2003 Michael Niedermayer <michaelni@gmx.at>
	*
	* This file is part of FFmpeg.
	*
	* FFmpeg is free software; you can redistribute it and/or
	* modify it under the terms of the GNU Lesser General Public
	* License as published by the Free Software Foundation; either
	* version 2.1 of the License, or (at your option) any later version.
	*
	* FFmpeg is distributed in the hope that it will be useful,
	* but WITHOUT ANY WARRANTY; without even the implied warranty of
	* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
	* Lesser General Public License for more details.
	*
	* You should have received a copy of the GNU Lesser General Public
	* License along with FFmpeg; if not, write to the Free Software
	* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
	*/

	/**
	* @file
	* @ingroup lavu_math_rational
	* Utilties for rational number calculation.
	* @author Michael Niedermayer <michaelni@gmx.at>
	*/

	#ifndef AVUTIL_RATIONAL_H
	#define AVUTIL_RATIONAL_H

	#include <stdint.h>
	#include <limits.h>
	#include "attributes.h"

	/**
	* @defgroup lavu_math_rational AVRational
	* @ingroup lavu_math
	* Rational number calculation.
	*
	* While rational numbers can be expressed as floating-point numbers, the
	* conversion process is a lossy one, so are floating-point operations. On the
	* other hand, the nature of FFmpeg demands highly accurate calculation of
	* timestamps. This set of rational number utilities serves as a generic
	* interface for manipulating rational numbers as pairs of numerators and
	* denominators.
	*
	* Many of the functions that operate on AVRational's have the suffix `_q`, in
	* reference to the mathematical symbol "ℚ" (Q) which denotes the set of all
	* rational numbers.
	*
	* @{
	*/

	/**
	* Rational number (pair of numerator and denominator).
	*/
	typedef struct AVRational{
	int num; ///< Numerator
	int den; ///< Denominator
	} AVRational;

	/**
	* Create an AVRational.
	*
	* Useful for compilers that do not support compound literals.
	*
	* @note The return value is not reduced.
	* @see av_reduce()
	*/
	static inline AVRational av_make_q(int num, int den)
	{
	AVRational r = { num, den };
	return r;
	}

	/**
	* Compare two rationals.
	*
	* @param a First rational
	* @param b Second rational
	*
	* @return One of the following values:
	* - 0 if `a == b`
	* - 1 if `a > b`
	* - -1 if `a < b`
	* - `INT_MIN` if one of the values is of the form `0 / 0`
	*/
	static inline int av_cmp_q(AVRational a, AVRational b){
	const int64_t tmp= a.num * (int64_t)b.den - b.num * (int64_t)a.den;

	if(tmp) return (int)((tmp ^ a.den ^ b.den)>>63)\|1;
	else if(b.den && a.den) return 0;
	else if(a.num && b.num) return (a.num>>31) - (b.num>>31);
	else return INT_MIN;
	}

	/**
	* Convert an AVRational to a `double`.
	* @param a AVRational to convert
	* @return `a` in floating-point form
	* @see av_d2q()
	*/
	static inline double av_q2d(AVRational a){
	return a.num / (double) a.den;
	}

	/**
	* Reduce a fraction.
	*
	* This is useful for framerate calculations.
	*
	* @param[out] dst_num Destination numerator
	* @param[out] dst_den Destination denominator
	* @param[in] num Source numerator
	* @param[in] den Source denominator
	* @param[in] max Maximum allowed values for `dst_num` & `dst_den`
	* @return 1 if the operation is exact, 0 otherwise
	*/
	int av_reduce(int dst_num, int dst_den, int64_t num, int64_t den, int64_t max);

	/**
	* Multiply two rationals.
	* @param b First rational
	* @param c Second rational
	* @return b*c
	*/
	AVRational av_mul_q(AVRational b, AVRational c) av_const;

	/**
	* Divide one rational by another.
	* @param b First rational
	* @param c Second rational
	* @return b/c
	*/
	AVRational av_div_q(AVRational b, AVRational c) av_const;

	/**
	* Add two rationals.
	* @param b First rational
	* @param c Second rational
	* @return b+c
	*/
	AVRational av_add_q(AVRational b, AVRational c) av_const;

	/**
	* Subtract one rational from another.
	* @param b First rational
	* @param c Second rational
	* @return b-c
	*/
	AVRational av_sub_q(AVRational b, AVRational c) av_const;

	/**
	* Invert a rational.
	* @param q value
	* @return 1 / q
	*/
	static av_always_inline AVRational av_inv_q(AVRational q)
	{
	AVRational r = { q.den, q.num };
	return r;
	}

	/**
	* Convert a double precision floating point number to a rational.
	*
	* In case of infinity, the returned value is expressed as `{1, 0}` or
	* `{-1, 0}` depending on the sign.
	*
	* @param d `double` to convert
	* @param max Maximum allowed numerator and denominator
	* @return `d` in AVRational form
	* @see av_q2d()
	*/
	AVRational av_d2q(double d, int max) av_const;

	/**
	* Find which of the two rationals is closer to another rational.
	*
	* @param q Rational to be compared against
	* @param q1,q2 Rationals to be tested
	* @return One of the following values:
	* - 1 if `q1` is nearer to `q` than `q2`
	* - -1 if `q2` is nearer to `q` than `q1`
	* - 0 if they have the same distance
	*/
	int av_nearer_q(AVRational q, AVRational q1, AVRational q2);

	/**
	* Find the value in a list of rationals nearest a given reference rational.
	*
	* @param q Reference rational
	* @param q_list Array of rationals terminated by `{0, 0}`
	* @return Index of the nearest value found in the array
	*/
	int av_find_nearest_q_idx(AVRational q, const AVRational* q_list);

	/**
	* Convert an AVRational to a IEEE 32-bit `float` expressed in fixed-point
	* format.
	*
	* @param q Rational to be converted
	* @return Equivalent floating-point value, expressed as an unsigned 32-bit
	* integer.
	* @note The returned value is platform-indepedant.
	*/
	uint32_t av_q2intfloat(AVRational q);

	/**
	* @}
	*/

	#endif /* AVUTIL_RATIONAL_H */