| /* |
| * 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 <common/hathreads.h> |
| #include <types/freq_ctr.h> |
| |
| |
| /* 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 unsigned int update_freq_ctr(struct freq_ctr *ctr, unsigned int inc) |
| { |
| int elapsed; |
| unsigned int curr_sec; |
| uint32_t now_tmp; |
| |
| |
| /* we manipulate curr_ctr using atomic ops out of the lock, since |
| * it's the most frequent access. However if we detect that a change |
| * is needed, it's done under the date lock. We don't care whether |
| * the value we're adding is considered as part of the current or |
| * new period if another thread starts to rotate the period while |
| * we operate, since timing variations would have resulted in the |
| * same uncertainty as well. |
| */ |
| curr_sec = ctr->curr_sec; |
| do { |
| now_tmp = global_now >> 32; |
| if (curr_sec == (now_tmp & 0x7fffffff)) |
| return _HA_ATOMIC_ADD(&ctr->curr_ctr, inc); |
| |
| /* remove the bit, used for the lock */ |
| curr_sec &= 0x7fffffff; |
| } while (!_HA_ATOMIC_CAS(&ctr->curr_sec, &curr_sec, curr_sec | 0x80000000)); |
| __ha_barrier_atomic_store(); |
| |
| elapsed = (now_tmp & 0x7fffffff) - curr_sec; |
| if (unlikely(elapsed > 0)) { |
| ctr->prev_ctr = ctr->curr_ctr; |
| _HA_ATOMIC_SUB(&ctr->curr_ctr, ctr->prev_ctr); |
| if (likely(elapsed != 1)) { |
| /* we missed more than one second */ |
| ctr->prev_ctr = 0; |
| } |
| curr_sec = now_tmp; |
| } |
| |
| /* release the lock and update the time in case of rotate. */ |
| _HA_ATOMIC_STORE(&ctr->curr_sec, curr_sec & 0x7fffffff); |
| |
| return _HA_ATOMIC_ADD(&ctr->curr_ctr, inc); |
| } |
| |
| /* 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 unsigned int update_freq_ctr_period(struct freq_ctr_period *ctr, |
| unsigned int period, unsigned int inc) |
| { |
| unsigned int curr_tick; |
| uint32_t now_ms_tmp; |
| |
| curr_tick = ctr->curr_tick; |
| do { |
| now_ms_tmp = global_now_ms; |
| if (now_ms_tmp - curr_tick < period) |
| return _HA_ATOMIC_ADD(&ctr->curr_ctr, inc); |
| |
| /* remove the bit, used for the lock */ |
| curr_tick &= ~1; |
| } while (!_HA_ATOMIC_CAS(&ctr->curr_tick, &curr_tick, curr_tick | 0x1)); |
| __ha_barrier_atomic_store(); |
| |
| if (now_ms_tmp - curr_tick >= period) { |
| ctr->prev_ctr = ctr->curr_ctr; |
| _HA_ATOMIC_SUB(&ctr->curr_ctr, ctr->prev_ctr); |
| curr_tick += period; |
| if (likely(now_ms_tmp - curr_tick >= period)) { |
| /* we missed at least two periods */ |
| ctr->prev_ctr = 0; |
| curr_tick = now_ms_tmp; |
| } |
| curr_tick &= ~1; |
| } |
| |
| /* release the lock and update the time in case of rotate. */ |
| _HA_ATOMIC_STORE(&ctr->curr_tick, curr_tick); |
| |
| return _HA_ATOMIC_ADD(&ctr->curr_ctr, inc); |
| } |
| |
| /* 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. In order to limit the impact of integer |
| * overflows, we'll use this equivalence which saves us one multiply : |
| * |
| * N - 1 1 x0 |
| * x1 = x0 * ------- = x0 * ( 1 - --- ) = x0 - ---- |
| * N N N |
| * |
| * And given that x0 is discrete here we'll have to saturate the values before |
| * performing the divide, so the value insertion will become : |
| * |
| * x0 + N - 1 |
| * x1 = x0 - ------------ |
| * 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. This function is |
| * thread-safe. |
| */ |
| static inline unsigned int swrate_add(unsigned int *sum, unsigned int n, unsigned int v) |
| { |
| unsigned int new_sum, old_sum; |
| |
| old_sum = *sum; |
| do { |
| new_sum = old_sum - (old_sum + n - 1) / n + v; |
| } while (!_HA_ATOMIC_CAS(sum, &old_sum, new_sum)); |
| return new_sum; |
| } |
| |
| /* Adds sample value <v> spanning <s> samples to sliding window sum <sum> |
| * configured for <n> samples, where <n> is supposed to be "much larger" than |
| * <s>. The sample is returned. Better if <n> is a power of two. Note that this |
| * is only an approximate. Indeed, as can be seen with two samples only over a |
| * 8-sample window, the original function would return : |
| * sum1 = sum - (sum + 7) / 8 + v |
| * sum2 = sum1 - (sum1 + 7) / 8 + v |
| * = (sum - (sum + 7) / 8 + v) - (sum - (sum + 7) / 8 + v + 7) / 8 + v |
| * ~= 7sum/8 - 7/8 + v - sum/8 + sum/64 - 7/64 - v/8 - 7/8 + v |
| * ~= (3sum/4 + sum/64) - (7/4 + 7/64) + 15v/8 |
| * |
| * while the function below would return : |
| * sum = sum + 2*v - (sum + 8) * 2 / 8 |
| * = 3sum/4 + 2v - 2 |
| * |
| * this presents an error of ~ (sum/64 + 9/64 + v/8) = (sum+n+1)/(n^s) + v/n |
| * |
| * Thus the simplified function effectively replaces a part of the history with |
| * a linear sum instead of applying the exponential one. But as long as s/n is |
| * "small enough", the error fades away and remains small for both small and |
| * large values of n and s (typically < 0.2% measured). This function is |
| * thread-safe. |
| */ |
| static inline unsigned int swrate_add_scaled(unsigned int *sum, unsigned int n, unsigned int v, unsigned int s) |
| { |
| unsigned int new_sum, old_sum; |
| |
| old_sum = *sum; |
| do { |
| new_sum = old_sum + v * s - div64_32((unsigned long long)(old_sum + n) * s, n); |
| } while (!_HA_ATOMIC_CAS(sum, &old_sum, new_sum)); |
| return new_sum; |
| } |
| |
| /* 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: |
| */ |