kernel/irq/timings.c - LeafOS-Devices/android_kernel_samsung_gta4xl - Gitiles

 /*
  * linux/kernel/irq/timings.c
  *
  * Copyright (C) 2016, Linaro Ltd - Daniel Lezcano <daniel.lezcano@linaro.org>
  *
  * This program is free software; you can redistribute it and/or modify
  * it under the terms of the GNU General Public License version 2 as
  * published by the Free Software Foundation.
  *
  */
 #include <linux/kernel.h>
 #include <linux/percpu.h>
 #include <linux/slab.h>
 #include <linux/static_key.h>
 #include <linux/interrupt.h>
 #include <linux/idr.h>
 #include <linux/irq.h>
 #include <linux/math64.h>

 #include <trace/events/irq.h>

 #include "internals.h"

 DEFINE_STATIC_KEY_FALSE(irq_timing_enabled);

 DEFINE_PER_CPU(struct irq_timings, irq_timings);

 struct irqt_stat {
 	u64	next_evt;
 	u64	last_ts;
 	u64	variance;
 	u32	avg;
 	u32	nr_samples;
 	int	anomalies;
 	int	valid;
 };

 static DEFINE_IDR(irqt_stats);

 void irq_timings_enable(void)
 {
 	static_branch_enable(&irq_timing_enabled);
 }

 void irq_timings_disable(void)
 {
 	static_branch_disable(&irq_timing_enabled);
 }

 /**
  * irqs_update - update the irq timing statistics with a new timestamp
  *
  * @irqs: an irqt_stat struct pointer
  * @ts: the new timestamp
  *
  * The statistics are computed online, in other words, the code is
  * designed to compute the statistics on a stream of values rather
  * than doing multiple passes on the values to compute the average,
  * then the variance. The integer division introduces a loss of
  * precision but with an acceptable error margin regarding the results
  * we would have with the double floating precision: we are dealing
  * with nanosec, so big numbers, consequently the mantisse is
  * negligeable, especially when converting the time in usec
  * afterwards.
  *
  * The computation happens at idle time. When the CPU is not idle, the
  * interrupts' timestamps are stored in the circular buffer, when the
  * CPU goes idle and this routine is called, all the buffer's values
  * are injected in the statistical model continuying to extend the
  * statistics from the previous busy-idle cycle.
  *
  * The observations showed a device will trigger a burst of periodic
  * interrupts followed by one or two peaks of longer time, for
  * instance when a SD card device flushes its cache, then the periodic
  * intervals occur again. A one second inactivity period resets the
  * stats, that gives us the certitude the statistical values won't
  * exceed 1x10^9, thus the computation won't overflow.
  *
  * Basically, the purpose of the algorithm is to watch the periodic
  * interrupts and eliminate the peaks.
  *
  * An interrupt is considered periodically stable if the interval of
  * its occurences follow the normal distribution, thus the values
  * comply with:
  *
  *      avg - 3 x stddev < value < avg + 3 x stddev
  *
  * Which can be simplified to:
  *
  *      -3 x stddev < value - avg < 3 x stddev
  *
  *      abs(value - avg) < 3 x stddev
  *
  * In order to save a costly square root computation, we use the
  * variance. For the record, stddev = sqrt(variance). The equation
  * above becomes:
  *
  *      abs(value - avg) < 3 x sqrt(variance)
  *
  * And finally we square it:
  *
  *      (value - avg) ^ 2 < (3 x sqrt(variance)) ^ 2
  *
  *      (value - avg) x (value - avg) < 9 x variance
  *
  * Statistically speaking, any values out of this interval is
  * considered as an anomaly and is discarded. However, a normal
  * distribution appears when the number of samples is 30 (it is the
  * rule of thumb in statistics, cf. "30 samples" on Internet). When
  * there are three consecutive anomalies, the statistics are resetted.
  *
  */
 static void irqs_update(struct irqt_stat *irqs, u64 ts)
 {
 	u64 old_ts = irqs->last_ts;
 	u64 variance = 0;
 	u64 interval;
 	s64 diff;

 	/*
 	 * The timestamps are absolute time values, we need to compute
 	 * the timing interval between two interrupts.
 	 */
 	irqs->last_ts = ts;

 	/*
 	 * The interval type is u64 in order to deal with the same
 	 * type in our computation, that prevent mindfuck issues with
 	 * overflow, sign and division.
 	 */
 	interval = ts - old_ts;

 	/*
 	 * The interrupt triggered more than one second apart, that
 	 * ends the sequence as predictible for our purpose. In this
 	 * case, assume we have the beginning of a sequence and the
 	 * timestamp is the first value. As it is impossible to
 	 * predict anything at this point, return.
 	 *
 	 * Note the first timestamp of the sequence will always fall
 	 * in this test because the old_ts is zero. That is what we
 	 * want as we need another timestamp to compute an interval.
 	 */
 	if (interval >= NSEC_PER_SEC) {
 		memset(irqs, 0, sizeof(*irqs));
 		irqs->last_ts = ts;
 		return;
 	}

 	/*
 	 * Pre-compute the delta with the average as the result is
 	 * used several times in this function.
 	 */
 	diff = interval - irqs->avg;

 	/*
 	 * Increment the number of samples.
 	 */
 	irqs->nr_samples++;

 	/*
 	 * Online variance divided by the number of elements if there
 	 * is more than one sample.  Normally the formula is division
 	 * by nr_samples - 1 but we assume the number of element will be
 	 * more than 32 and dividing by 32 instead of 31 is enough
 	 * precise.
 	 */
 	if (likely(irqs->nr_samples > 1))
 		variance = irqs->variance >> IRQ_TIMINGS_SHIFT;

 	/*
 	 * The rule of thumb in statistics for the normal distribution
 	 * is having at least 30 samples in order to have the model to
 	 * apply. Values outside the interval are considered as an
 	 * anomaly.
 	 */
 	if ((irqs->nr_samples >= 30) && ((diff * diff) > (9 * variance))) {
 		/*
 		 * After three consecutive anomalies, we reset the
 		 * stats as it is no longer stable enough.
 		 */
 		if (irqs->anomalies++ >= 3) {
 			memset(irqs, 0, sizeof(*irqs));
 			irqs->last_ts = ts;
 			return;
 		}
 	} else {
 		/*
 		 * The anomalies must be consecutives, so at this
 		 * point, we reset the anomalies counter.
 		 */
 		irqs->anomalies = 0;
 	}

 	/*
 	 * The interrupt is considered stable enough to try to predict
 	 * the next event on it.
 	 */
 	irqs->valid = 1;

 	/*
 	 * Online average algorithm:
 	 *
 	 *  new_average = average + ((value - average) / count)
 	 *
 	 * The variance computation depends on the new average
 	 * to be computed here first.
 	 *
 	 */
 	irqs->avg = irqs->avg + (diff >> IRQ_TIMINGS_SHIFT);

 	/*
 	 * Online variance algorithm:
 	 *
 	 *  new_variance = variance + (value - average) x (value - new_average)
 	 *
 	 * Warning: irqs->avg is updated with the line above, hence
 	 * 'interval - irqs->avg' is no longer equal to 'diff'
 	 */
 	irqs->variance = irqs->variance + (diff * (interval - irqs->avg));

 	/*
 	 * Update the next event
 	 */
 	irqs->next_evt = ts + irqs->avg;
 }

 /**
  * irq_timings_next_event - Return when the next event is supposed to arrive
  *
  * During the last busy cycle, the number of interrupts is incremented
  * and stored in the irq_timings structure. This information is
  * necessary to:
  *
  * - know if the index in the table wrapped up:
  *
  *      If more than the array size interrupts happened during the
  *      last busy/idle cycle, the index wrapped up and we have to
  *      begin with the next element in the array which is the last one
  *      in the sequence, otherwise it is a the index 0.
  *
  * - have an indication of the interrupts activity on this CPU
  *   (eg. irq/sec)
  *
  * The values are 'consumed' after inserting in the statistical model,
  * thus the count is reinitialized.
  *
  * The array of values **must** be browsed in the time direction, the
  * timestamp must increase between an element and the next one.
  *
  * Returns a nanosec time based estimation of the earliest interrupt,
  * U64_MAX otherwise.
  */
 u64 irq_timings_next_event(u64 now)
 {
 	struct irq_timings *irqts = this_cpu_ptr(&irq_timings);
 	struct irqt_stat *irqs;
 	struct irqt_stat __percpu *s;
 	u64 ts, next_evt = U64_MAX;
 	int i, irq = 0;

 	/*
 	 * This function must be called with the local irq disabled in
 	 * order to prevent the timings circular buffer to be updated
 	 * while we are reading it.
 	 */
 	WARN_ON_ONCE(!irqs_disabled());

 	/*
 	 * Number of elements in the circular buffer: If it happens it
 	 * was flushed before, then the number of elements could be
 	 * smaller than IRQ_TIMINGS_SIZE, so the count is used,
 	 * otherwise the array size is used as we wrapped. The index
 	 * begins from zero when we did not wrap. That could be done
 	 * in a nicer way with the proper circular array structure
 	 * type but with the cost of extra computation in the
 	 * interrupt handler hot path. We choose efficiency.
 	 *
 	 * Inject measured irq/timestamp to the statistical model
 	 * while decrementing the counter because we consume the data
 	 * from our circular buffer.
 	 */
 	for (i = irqts->count & IRQ_TIMINGS_MASK,
 		     irqts->count = min(IRQ_TIMINGS_SIZE, irqts->count);
 	     irqts->count > 0; irqts->count--, i = (i + 1) & IRQ_TIMINGS_MASK) {

 		irq = irq_timing_decode(irqts->values[i], &ts);

 		s = idr_find(&irqt_stats, irq);
 		if (s) {
 			irqs = this_cpu_ptr(s);
 			irqs_update(irqs, ts);
 		}
 	}

 	/*
 	 * Look in the list of interrupts' statistics, the earliest
 	 * next event.
 	 */
 	idr_for_each_entry(&irqt_stats, s, i) {

 		irqs = this_cpu_ptr(s);

 		if (!irqs->valid)
 			continue;

 		if (irqs->next_evt <= now) {
 			irq = i;
 			next_evt = now;

 			/*
 			 * This interrupt mustn't use in the future
 			 * until new events occur and update the
 			 * statistics.
 			 */
 			irqs->valid = 0;
 			break;
 		}

 		if (irqs->next_evt < next_evt) {
 			irq = i;
 			next_evt = irqs->next_evt;
 		}
 	}

 	return next_evt;
 }

 void irq_timings_free(int irq)
 {
 	struct irqt_stat __percpu *s;

 	s = idr_find(&irqt_stats, irq);
 	if (s) {
 		free_percpu(s);
 		idr_remove(&irqt_stats, irq);
 	}
 }

 int irq_timings_alloc(int irq)
 {
 	struct irqt_stat __percpu *s;
 	int id;

 	/*
 	 * Some platforms can have the same private interrupt per cpu,
 	 * so this function may be be called several times with the
 	 * same interrupt number. Just bail out in case the per cpu
 	 * stat structure is already allocated.
 	 */
 	s = idr_find(&irqt_stats, irq);
 	if (s)
 		return 0;

 	s = alloc_percpu(*s);
 	if (!s)
 		return -ENOMEM;

 	idr_preload(GFP_KERNEL);
 	id = idr_alloc(&irqt_stats, s, irq, irq + 1, GFP_NOWAIT);
 	idr_preload_end();

 	if (id < 0) {
 		free_percpu(s);
 		return id;
 	}

 	return 0;
 }
	/*
	* linux/kernel/irq/timings.c
	*
	* Copyright (C) 2016, Linaro Ltd - Daniel Lezcano <daniel.lezcano@linaro.org>
	*
	* This program is free software; you can redistribute it and/or modify
	* it under the terms of the GNU General Public License version 2 as
	* published by the Free Software Foundation.
	*
	*/
	#include <linux/kernel.h>
	#include <linux/percpu.h>
	#include <linux/slab.h>
	#include <linux/static_key.h>
	#include <linux/interrupt.h>
	#include <linux/idr.h>
	#include <linux/irq.h>
	#include <linux/math64.h>

	#include <trace/events/irq.h>

	#include "internals.h"

	DEFINE_STATIC_KEY_FALSE(irq_timing_enabled);

	DEFINE_PER_CPU(struct irq_timings, irq_timings);

	struct irqt_stat {
	u64 next_evt;
	u64 last_ts;
	u64 variance;
	u32 avg;
	u32 nr_samples;
	int anomalies;
	int valid;
	};

	static DEFINE_IDR(irqt_stats);

	void irq_timings_enable(void)
	{
	static_branch_enable(&irq_timing_enabled);
	}

	void irq_timings_disable(void)
	{
	static_branch_disable(&irq_timing_enabled);
	}

	/**
	* irqs_update - update the irq timing statistics with a new timestamp
	*
	* @irqs: an irqt_stat struct pointer
	* @ts: the new timestamp
	*
	* The statistics are computed online, in other words, the code is
	* designed to compute the statistics on a stream of values rather
	* than doing multiple passes on the values to compute the average,
	* then the variance. The integer division introduces a loss of
	* precision but with an acceptable error margin regarding the results
	* we would have with the double floating precision: we are dealing
	* with nanosec, so big numbers, consequently the mantisse is
	* negligeable, especially when converting the time in usec
	* afterwards.
	*
	* The computation happens at idle time. When the CPU is not idle, the
	* interrupts' timestamps are stored in the circular buffer, when the
	* CPU goes idle and this routine is called, all the buffer's values
	* are injected in the statistical model continuying to extend the
	* statistics from the previous busy-idle cycle.
	*
	* The observations showed a device will trigger a burst of periodic
	* interrupts followed by one or two peaks of longer time, for
	* instance when a SD card device flushes its cache, then the periodic
	* intervals occur again. A one second inactivity period resets the
	* stats, that gives us the certitude the statistical values won't
	* exceed 1x10^9, thus the computation won't overflow.
	*
	* Basically, the purpose of the algorithm is to watch the periodic
	* interrupts and eliminate the peaks.
	*
	* An interrupt is considered periodically stable if the interval of
	* its occurences follow the normal distribution, thus the values
	* comply with:
	*
	* avg - 3 x stddev < value < avg + 3 x stddev
	*
	* Which can be simplified to:
	*
	* -3 x stddev < value - avg < 3 x stddev
	*
	* abs(value - avg) < 3 x stddev
	*
	* In order to save a costly square root computation, we use the
	* variance. For the record, stddev = sqrt(variance). The equation
	* above becomes:
	*
	* abs(value - avg) < 3 x sqrt(variance)
	*
	* And finally we square it:
	*
	* (value - avg) ^ 2 < (3 x sqrt(variance)) ^ 2
	*
	* (value - avg) x (value - avg) < 9 x variance
	*
	* Statistically speaking, any values out of this interval is
	* considered as an anomaly and is discarded. However, a normal
	* distribution appears when the number of samples is 30 (it is the
	* rule of thumb in statistics, cf. "30 samples" on Internet). When
	* there are three consecutive anomalies, the statistics are resetted.
	*
	*/
	static void irqs_update(struct irqt_stat *irqs, u64 ts)
	{
	u64 old_ts = irqs->last_ts;
	u64 variance = 0;
	u64 interval;
	s64 diff;

	/*
	* The timestamps are absolute time values, we need to compute
	* the timing interval between two interrupts.
	*/
	irqs->last_ts = ts;

	/*
	* The interval type is u64 in order to deal with the same
	* type in our computation, that prevent mindfuck issues with
	* overflow, sign and division.
	*/
	interval = ts - old_ts;

	/*
	* The interrupt triggered more than one second apart, that
	* ends the sequence as predictible for our purpose. In this
	* case, assume we have the beginning of a sequence and the
	* timestamp is the first value. As it is impossible to
	* predict anything at this point, return.
	*
	* Note the first timestamp of the sequence will always fall
	* in this test because the old_ts is zero. That is what we
	* want as we need another timestamp to compute an interval.
	*/
	if (interval >= NSEC_PER_SEC) {
	memset(irqs, 0, sizeof(*irqs));
	irqs->last_ts = ts;
	return;
	}

	/*
	* Pre-compute the delta with the average as the result is
	* used several times in this function.
	*/
	diff = interval - irqs->avg;

	/*
	* Increment the number of samples.
	*/
	irqs->nr_samples++;

	/*
	* Online variance divided by the number of elements if there
	* is more than one sample. Normally the formula is division
	* by nr_samples - 1 but we assume the number of element will be
	* more than 32 and dividing by 32 instead of 31 is enough
	* precise.
	*/
	if (likely(irqs->nr_samples > 1))
	variance = irqs->variance >> IRQ_TIMINGS_SHIFT;

	/*
	* The rule of thumb in statistics for the normal distribution
	* is having at least 30 samples in order to have the model to
	* apply. Values outside the interval are considered as an
	* anomaly.
	*/
	if ((irqs->nr_samples >= 30) && ((diff * diff) > (9 * variance))) {
	/*
	* After three consecutive anomalies, we reset the
	* stats as it is no longer stable enough.
	*/
	if (irqs->anomalies++ >= 3) {
	memset(irqs, 0, sizeof(*irqs));
	irqs->last_ts = ts;
	return;
	}
	} else {
	/*
	* The anomalies must be consecutives, so at this
	* point, we reset the anomalies counter.
	*/
	irqs->anomalies = 0;
	}

	/*
	* The interrupt is considered stable enough to try to predict
	* the next event on it.
	*/
	irqs->valid = 1;

	/*
	* Online average algorithm:
	*
	* new_average = average + ((value - average) / count)
	*
	* The variance computation depends on the new average
	* to be computed here first.
	*
	*/
	irqs->avg = irqs->avg + (diff >> IRQ_TIMINGS_SHIFT);

	/*
	* Online variance algorithm:
	*
	* new_variance = variance + (value - average) x (value - new_average)
	*
	* Warning: irqs->avg is updated with the line above, hence
	* 'interval - irqs->avg' is no longer equal to 'diff'
	*/
	irqs->variance = irqs->variance + (diff * (interval - irqs->avg));

	/*
	* Update the next event
	*/
	irqs->next_evt = ts + irqs->avg;
	}

	/**
	* irq_timings_next_event - Return when the next event is supposed to arrive
	*
	* During the last busy cycle, the number of interrupts is incremented
	* and stored in the irq_timings structure. This information is
	* necessary to:
	*
	* - know if the index in the table wrapped up:
	*
	* If more than the array size interrupts happened during the
	* last busy/idle cycle, the index wrapped up and we have to
	* begin with the next element in the array which is the last one
	* in the sequence, otherwise it is a the index 0.
	*
	* - have an indication of the interrupts activity on this CPU
	* (eg. irq/sec)
	*
	* The values are 'consumed' after inserting in the statistical model,
	* thus the count is reinitialized.
	*
	* The array of values must be browsed in the time direction, the
	* timestamp must increase between an element and the next one.
	*
	* Returns a nanosec time based estimation of the earliest interrupt,
	* U64_MAX otherwise.
	*/
	u64 irq_timings_next_event(u64 now)
	{
	struct irq_timings *irqts = this_cpu_ptr(&irq_timings);
	struct irqt_stat *irqs;
	struct irqt_stat __percpu *s;
	u64 ts, next_evt = U64_MAX;
	int i, irq = 0;

	/*
	* This function must be called with the local irq disabled in
	* order to prevent the timings circular buffer to be updated
	* while we are reading it.
	*/
	WARN_ON_ONCE(!irqs_disabled());

	/*
	* Number of elements in the circular buffer: If it happens it
	* was flushed before, then the number of elements could be
	* smaller than IRQ_TIMINGS_SIZE, so the count is used,
	* otherwise the array size is used as we wrapped. The index
	* begins from zero when we did not wrap. That could be done
	* in a nicer way with the proper circular array structure
	* type but with the cost of extra computation in the
	* interrupt handler hot path. We choose efficiency.
	*
	* Inject measured irq/timestamp to the statistical model
	* while decrementing the counter because we consume the data
	* from our circular buffer.
	*/
	for (i = irqts->count & IRQ_TIMINGS_MASK,
	irqts->count = min(IRQ_TIMINGS_SIZE, irqts->count);
	irqts->count > 0; irqts->count--, i = (i + 1) & IRQ_TIMINGS_MASK) {

	irq = irq_timing_decode(irqts->values[i], &ts);

	s = idr_find(&irqt_stats, irq);
	if (s) {
	irqs = this_cpu_ptr(s);
	irqs_update(irqs, ts);
	}
	}

	/*
	* Look in the list of interrupts' statistics, the earliest
	* next event.
	*/
	idr_for_each_entry(&irqt_stats, s, i) {

	irqs = this_cpu_ptr(s);

	if (!irqs->valid)
	continue;

	if (irqs->next_evt <= now) {
	irq = i;
	next_evt = now;

	/*
	* This interrupt mustn't use in the future
	* until new events occur and update the
	* statistics.
	*/
	irqs->valid = 0;
	break;
	}

	if (irqs->next_evt < next_evt) {
	irq = i;
	next_evt = irqs->next_evt;
	}
	}

	return next_evt;
	}

	void irq_timings_free(int irq)
	{
	struct irqt_stat __percpu *s;

	s = idr_find(&irqt_stats, irq);
	if (s) {
	free_percpu(s);
	idr_remove(&irqt_stats, irq);
	}
	}

	int irq_timings_alloc(int irq)
	{
	struct irqt_stat __percpu *s;
	int id;

	/*
	* Some platforms can have the same private interrupt per cpu,
	* so this function may be be called several times with the
	* same interrupt number. Just bail out in case the per cpu
	* stat structure is already allocated.
	*/
	s = idr_find(&irqt_stats, irq);
	if (s)
	return 0;

	s = alloc_percpu(*s);
	if (!s)
	return -ENOMEM;

	idr_preload(GFP_KERNEL);
	id = idr_alloc(&irqt_stats, s, irq, irq + 1, GFP_NOWAIT);
	idr_preload_end();

	if (id < 0) {
	free_percpu(s);
	return id;
	}

	return 0;
	}