include/proto/freq_ctr.h - haproxy - Gitiles

 /*
  * include/proto/freq_ctr.h
  * This file contains macros and inline functions for frequency counters.
  *
  * Copyright (C) 2000-2014 Willy Tarreau - w@1wt.eu
  *
  * This library 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, version 2.1
  * exclusively.
  *
  * This library 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 this library; if not, write to the Free Software
  * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA  02110-1301  USA
  */

 #ifndef _PROTO_FREQ_CTR_H
 #define _PROTO_FREQ_CTR_H

 #include <common/config.h>
 #include <common/time.h>
 #include <types/freq_ctr.h>

 /* Rotate a frequency counter when current period is over. Must not be called
  * during a valid period. It is important that it correctly initializes a null
  * area.
  */
 static inline void rotate_freq_ctr(struct freq_ctr *ctr)
 {
 	ctr->prev_ctr = ctr->curr_ctr;
 	if (likely(now.tv_sec - ctr->curr_sec != 1)) {
 		/* we missed more than one second */
 		ctr->prev_ctr = 0;
 	}
 	ctr->curr_sec = now.tv_sec;
 	ctr->curr_ctr = 0; /* leave it at the end to help gcc optimize it away */
 }

 /* Update a frequency counter by <inc> incremental units. It is automatically
  * rotated if the period is over. It is important that it correctly initializes
  * a null area.
  */
 static inline void update_freq_ctr(struct freq_ctr *ctr, unsigned int inc)
 {
 	if (likely(ctr->curr_sec == now.tv_sec)) {
 		ctr->curr_ctr += inc;
 		return;
 	}
 	rotate_freq_ctr(ctr);
 	ctr->curr_ctr = inc;
 	/* Note: later we may want to propagate the update to other counters */
 }

 /* Rotate a frequency counter when current period is over. Must not be called
  * during a valid period. It is important that it correctly initializes a null
  * area. This one works on frequency counters which have a period different
  * from one second.
  */
 static inline void rotate_freq_ctr_period(struct freq_ctr_period *ctr,
 					  unsigned int period)
 {
 	ctr->prev_ctr = ctr->curr_ctr;
 	ctr->curr_tick += period;
 	if (likely(now_ms - ctr->curr_tick >= period)) {
 		/* we missed at least two periods */
 		ctr->prev_ctr = 0;
 		ctr->curr_tick = now_ms;
 	}
 	ctr->curr_ctr = 0; /* leave it at the end to help gcc optimize it away */
 }

 /* Update a frequency counter by <inc> incremental units. It is automatically
  * rotated if the period is over. It is important that it correctly initializes
  * a null area. This one works on frequency counters which have a period
  * different from one second.
  */
 static inline void update_freq_ctr_period(struct freq_ctr_period *ctr,
 					  unsigned int period, unsigned int inc)
 {
 	if (likely(now_ms - ctr->curr_tick < period)) {
 		ctr->curr_ctr += inc;
 		return;
 	}
 	rotate_freq_ctr_period(ctr, period);
 	ctr->curr_ctr = inc;
 	/* Note: later we may want to propagate the update to other counters */
 }

 /* Read a frequency counter taking history into account for missing time in
  * current period.
  */
 unsigned int read_freq_ctr(struct freq_ctr *ctr);

 /* returns the number of remaining events that can occur on this freq counter
  * while respecting <freq> and taking into account that <pend> events are
  * already known to be pending. Returns 0 if limit was reached.
  */
 unsigned int freq_ctr_remain(struct freq_ctr *ctr, unsigned int freq, unsigned int pend);

 /* return the expected wait time in ms before the next event may occur,
  * respecting frequency <freq>, and assuming there may already be some pending
  * events. It returns zero if we can proceed immediately, otherwise the wait
  * time, which will be rounded down 1ms for better accuracy, with a minimum
  * of one ms.
  */
 unsigned int next_event_delay(struct freq_ctr *ctr, unsigned int freq, unsigned int pend);

 /* process freq counters over configurable periods */
 unsigned int read_freq_ctr_period(struct freq_ctr_period *ctr, unsigned int period);
 unsigned int freq_ctr_remain_period(struct freq_ctr_period *ctr, unsigned int period,
 				    unsigned int freq, unsigned int pend);

 /* While the functions above report average event counts per period, we are
  * also interested in average values per event. For this we use a different
  * method. The principle is to rely on a long tail which sums the new value
  * with a fraction of the previous value, resulting in a sliding window of
  * infinite length depending on the precision we're interested in.
  *
  * The idea is that we always keep (N-1)/N of the sum and add the new sampled
  * value. The sum over N values can be computed with a simple program for a
  * constant value 1 at each iteration :
  *
  *     N
  *   ,---
  *    \       N - 1              e - 1
  *     >  ( --------- )^x ~= N * -----
  *    /         N                  e
  *   '---
  *   x = 1
  *
  * Note: I'm not sure how to demonstrate this but at least this is easily
  * verified with a simple program, the sum equals N * 0.632120 for any N
  * moderately large (tens to hundreds).
  *
  * Inserting a constant sample value V here simply results in :
  *
  *    sum = V * N * (e - 1) / e
  *
  * But we don't want to integrate over a small period, but infinitely. Let's
  * cut the infinity in P periods of N values. Each period M is exactly the same
  * as period M-1 with a factor of ((N-1)/N)^N applied. A test shows that given a
  * large N :
  *
  *      N - 1           1
  *   ( ------- )^N ~=  ---
  *        N             e
  *
  * Our sum is now a sum of each factor times  :
  *
  *    N*P                                     P
  *   ,---                                   ,---
  *    \         N - 1               e - 1    \     1
  *     >  v ( --------- )^x ~= VN * -----  *  >   ---
  *    /           N                   e      /    e^x
  *   '---                                   '---
  *   x = 1                                  x = 0
  *
  * For P "large enough", in tests we get this :
  *
  *    P
  *  ,---
  *   \     1        e
  *    >   --- ~=  -----
  *   /    e^x     e - 1
  *  '---
  *  x = 0
  *
  * This simplifies the sum above :
  *
  *    N*P
  *   ,---
  *    \         N - 1
  *     >  v ( --------- )^x = VN
  *    /           N
  *   '---
  *   x = 1
  *
  * So basically by summing values and applying the last result an (N-1)/N factor
  * we just get N times the values over the long term, so we can recover the
  * constant value V by dividing by N.
  *
  * A value added at the entry of the sliding window of N values will thus be
  * reduced to 1/e or 36.7% after N terms have been added. After a second batch,
  * it will only be 1/e^2, or 13.5%, and so on. So practically speaking, each
  * old period of N values represents only a quickly fading ratio of the global
  * sum :
  *
  *   period    ratio
  *     1       36.7%
  *     2       13.5%
  *     3       4.98%
  *     4       1.83%
  *     5       0.67%
  *     6       0.25%
  *     7       0.09%
  *     8       0.033%
  *     9       0.012%
  *    10       0.0045%
  *
  * So after 10N samples, the initial value has already faded out by a factor of
  * 22026, which is quite fast. If the sliding window is 1024 samples wide, it
  * means that a sample will only count for 1/22k of its initial value after 10k
  * samples went after it, which results in half of the value it would represent
  * using an arithmetic mean. The benefit of this method is that it's very cheap
  * in terms of computations when N is a power of two. This is very well suited
  * to record response times as large values will fade out faster than with an
  * arithmetic mean and will depend on sample count and not time.
  *
  * Demonstrating all the above assumptions with maths instead of a program is
  * left as an exercise for the reader.
  */

 /* Adds sample value <v> to sliding window sum <sum> configured for <n> samples.
  * The sample is returned. Better if <n> is a power of two.
  */
 static inline unsigned int swrate_add(unsigned int *sum, unsigned int n, unsigned int v)
 {
 	return *sum = *sum * (n - 1) / n + v;
 }

 /* Returns the average sample value for the sum <sum> over a sliding window of
  * <n> samples. Better if <n> is a power of two. It must be the same <n> as the
  * one used above in all additions.
  */
 static inline unsigned int swrate_avg(unsigned int sum, unsigned int n)
 {
 	return (sum + n - 1) / n;
 }

 #endif /* _PROTO_FREQ_CTR_H */

 /*
  * Local variables:
  *  c-indent-level: 8
  *  c-basic-offset: 8
  * End:
   */
	/*
	* include/proto/freq_ctr.h
	* This file contains macros and inline functions for frequency counters.
	*
	* Copyright (C) 2000-2014 Willy Tarreau - w@1wt.eu
	*
	* This library 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, version 2.1
	* exclusively.
	*
	* This library 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 this library; if not, write to the Free Software
	* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
	*/

	#ifndef _PROTO_FREQ_CTR_H
	#define _PROTO_FREQ_CTR_H

	#include <common/config.h>
	#include <common/time.h>
	#include <types/freq_ctr.h>

	/* Rotate a frequency counter when current period is over. Must not be called
	* during a valid period. It is important that it correctly initializes a null
	* area.
	*/
	static inline void rotate_freq_ctr(struct freq_ctr *ctr)
	{
	ctr->prev_ctr = ctr->curr_ctr;
	if (likely(now.tv_sec - ctr->curr_sec != 1)) {
	/* we missed more than one second */
	ctr->prev_ctr = 0;
	}
	ctr->curr_sec = now.tv_sec;
	ctr->curr_ctr = 0; /* leave it at the end to help gcc optimize it away */
	}

	/* Update a frequency counter by <inc> incremental units. It is automatically
	* rotated if the period is over. It is important that it correctly initializes
	* a null area.
	*/
	static inline void update_freq_ctr(struct freq_ctr *ctr, unsigned int inc)
	{
	if (likely(ctr->curr_sec == now.tv_sec)) {
	ctr->curr_ctr += inc;
	return;
	}
	rotate_freq_ctr(ctr);
	ctr->curr_ctr = inc;
	/* Note: later we may want to propagate the update to other counters */
	}

	/* Rotate a frequency counter when current period is over. Must not be called
	* during a valid period. It is important that it correctly initializes a null
	* area. This one works on frequency counters which have a period different
	* from one second.
	*/
	static inline void rotate_freq_ctr_period(struct freq_ctr_period *ctr,
	unsigned int period)
	{
	ctr->prev_ctr = ctr->curr_ctr;
	ctr->curr_tick += period;
	if (likely(now_ms - ctr->curr_tick >= period)) {
	/* we missed at least two periods */
	ctr->prev_ctr = 0;
	ctr->curr_tick = now_ms;
	}
	ctr->curr_ctr = 0; /* leave it at the end to help gcc optimize it away */
	}

	/* Update a frequency counter by <inc> incremental units. It is automatically
	* rotated if the period is over. It is important that it correctly initializes
	* a null area. This one works on frequency counters which have a period
	* different from one second.
	*/
	static inline void update_freq_ctr_period(struct freq_ctr_period *ctr,
	unsigned int period, unsigned int inc)
	{
	if (likely(now_ms - ctr->curr_tick < period)) {
	ctr->curr_ctr += inc;
	return;
	}
	rotate_freq_ctr_period(ctr, period);
	ctr->curr_ctr = inc;
	/* Note: later we may want to propagate the update to other counters */
	}

	/* Read a frequency counter taking history into account for missing time in
	* current period.
	*/
	unsigned int read_freq_ctr(struct freq_ctr *ctr);

	/* returns the number of remaining events that can occur on this freq counter
	* while respecting <freq> and taking into account that <pend> events are
	* already known to be pending. Returns 0 if limit was reached.
	*/
	unsigned int freq_ctr_remain(struct freq_ctr *ctr, unsigned int freq, unsigned int pend);

	/* return the expected wait time in ms before the next event may occur,
	* respecting frequency <freq>, and assuming there may already be some pending
	* events. It returns zero if we can proceed immediately, otherwise the wait
	* time, which will be rounded down 1ms for better accuracy, with a minimum
	* of one ms.
	*/
	unsigned int next_event_delay(struct freq_ctr *ctr, unsigned int freq, unsigned int pend);

	/* process freq counters over configurable periods */
	unsigned int read_freq_ctr_period(struct freq_ctr_period *ctr, unsigned int period);
	unsigned int freq_ctr_remain_period(struct freq_ctr_period *ctr, unsigned int period,
	unsigned int freq, unsigned int pend);

	/* While the functions above report average event counts per period, we are
	* also interested in average values per event. For this we use a different
	* method. The principle is to rely on a long tail which sums the new value
	* with a fraction of the previous value, resulting in a sliding window of
	* infinite length depending on the precision we're interested in.
	*
	* The idea is that we always keep (N-1)/N of the sum and add the new sampled
	* value. The sum over N values can be computed with a simple program for a
	* constant value 1 at each iteration :
	*
	* N
	* ,---
	* \ N - 1 e - 1
	* > ( --------- )^x ~= N * -----
	* / N e
	* '---
	* x = 1
	*
	* Note: I'm not sure how to demonstrate this but at least this is easily
	* verified with a simple program, the sum equals N * 0.632120 for any N
	* moderately large (tens to hundreds).
	*
	* Inserting a constant sample value V here simply results in :
	*
	* sum = V * N * (e - 1) / e
	*
	* But we don't want to integrate over a small period, but infinitely. Let's
	* cut the infinity in P periods of N values. Each period M is exactly the same
	* as period M-1 with a factor of ((N-1)/N)^N applied. A test shows that given a
	* large N :
	*
	* N - 1 1
	* ( ------- )^N ~= ---
	* N e
	*
	* Our sum is now a sum of each factor times :
	*
	* N*P P
	* ,--- ,---
	* \ N - 1 e - 1 \ 1
	* > v ( --------- )^x ~= VN * ----- * > ---
	* / N e / e^x
	* '--- '---
	* x = 1 x = 0
	*
	* For P "large enough", in tests we get this :
	*
	* P
	* ,---
	* \ 1 e
	* > --- ~= -----
	* / e^x e - 1
	* '---
	* x = 0
	*
	* This simplifies the sum above :
	*
	* N*P
	* ,---
	* \ N - 1
	* > v ( --------- )^x = VN
	* / N
	* '---
	* x = 1
	*
	* So basically by summing values and applying the last result an (N-1)/N factor
	* we just get N times the values over the long term, so we can recover the
	* constant value V by dividing by N.
	*
	* A value added at the entry of the sliding window of N values will thus be
	* reduced to 1/e or 36.7% after N terms have been added. After a second batch,
	* it will only be 1/e^2, or 13.5%, and so on. So practically speaking, each
	* old period of N values represents only a quickly fading ratio of the global
	* sum :
	*
	* period ratio
	* 1 36.7%
	* 2 13.5%
	* 3 4.98%
	* 4 1.83%
	* 5 0.67%
	* 6 0.25%
	* 7 0.09%
	* 8 0.033%
	* 9 0.012%
	* 10 0.0045%
	*
	* So after 10N samples, the initial value has already faded out by a factor of
	* 22026, which is quite fast. If the sliding window is 1024 samples wide, it
	* means that a sample will only count for 1/22k of its initial value after 10k
	* samples went after it, which results in half of the value it would represent
	* using an arithmetic mean. The benefit of this method is that it's very cheap
	* in terms of computations when N is a power of two. This is very well suited
	* to record response times as large values will fade out faster than with an
	* arithmetic mean and will depend on sample count and not time.
	*
	* Demonstrating all the above assumptions with maths instead of a program is
	* left as an exercise for the reader.
	*/

	/* Adds sample value <v> to sliding window sum <sum> configured for <n> samples.
	* The sample is returned. Better if <n> is a power of two.
	*/
	static inline unsigned int swrate_add(unsigned int *sum, unsigned int n, unsigned int v)
	{
	return sum = sum * (n - 1) / n + v;
	}

	/* Returns the average sample value for the sum <sum> over a sliding window of
	* <n> samples. Better if <n> is a power of two. It must be the same <n> as the
	* one used above in all additions.
	*/
	static inline unsigned int swrate_avg(unsigned int sum, unsigned int n)
	{
	return (sum + n - 1) / n;
	}

	#endif /* _PROTO_FREQ_CTR_H */

	/*
	* Local variables:
	* c-indent-level: 8
	* c-basic-offset: 8
	* End:
	*/