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184 lines
7.0 KiB
Go
184 lines
7.0 KiB
Go
2 years ago
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// Copyright (c) Tailscale Inc & AUTHORS
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// SPDX-License-Identifier: BSD-3-Clause
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package rate
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import (
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"fmt"
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"math"
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"sync"
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"time"
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"tailscale.com/tstime/mono"
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)
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// Value measures the rate at which events occur,
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// exponentially weighted towards recent activity.
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// It is guaranteed to occupy O(1) memory, operate in O(1) runtime,
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// and is safe for concurrent use.
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// The zero value is safe for immediate use.
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//
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// The algorithm is based on and semantically equivalent to
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// [exponentially weighted moving averages (EWMAs)],
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// but modified to avoid assuming that event samples are gathered
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// at fixed and discrete time-step intervals.
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//
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// In EWMA literature, the average is typically tuned with a λ parameter
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// that determines how much weight to give to recent event samples.
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// A high λ value reacts quickly to new events favoring recent history,
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// while a low λ value reacts more slowly to new events.
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// The EWMA is computed as:
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//
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// zᵢ = λxᵢ + (1-λ)zᵢ₋₁
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//
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// where:
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// - λ is the weight parameter, where 0 ≤ λ ≤ 1
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// - xᵢ is the number of events that has since occurred
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// - zᵢ is the newly computed moving average
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// - zᵢ₋₁ is the previous moving average one time-step ago
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//
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// As mentioned, this implementation does not assume that the average
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// is updated periodically on a fixed time-step interval,
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// but allows the application to indicate that events occurred
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// at any point in time by simply calling Value.Add.
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// Thus, for every time Value.Add is called, it takes into consideration
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// the amount of time elapsed since the last call to Value.Add as
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// opposed to assuming that every call to Value.Add is evenly spaced
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// some fixed time-step interval apart.
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//
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// Since time is critical to this measurement, we tune the metric not
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// with the weight parameter λ (a unit-less constant between 0 and 1),
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// but rather as a half-life period t½. The half-life period is
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// mathematically equivalent but easier for humans to reason about.
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// The parameters λ and t½ and directly related in the following way:
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//
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// t½ = -(ln(2) · ΔT) / ln(1 - λ)
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//
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// λ = 1 - 2^-(ΔT / t½)
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//
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// where:
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// - t½ is the half-life commonly used with exponential decay
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// - λ is the unit-less weight parameter commonly used with EWMAs
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// - ΔT is the discrete time-step interval used with EWMAs
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//
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// The internal algorithm does not use the EWMA formula,
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// but is rather based on [half-life decay].
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// The formula for half-life decay is mathematically related
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// to the formula for computing the EWMA.
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// The calculation of an EWMA is a geometric progression [[1]] and
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// is essentially a discrete version of an exponential function [[2]],
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// for which half-life decay is one particular expression.
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// Given sufficiently small time-steps, the EWMA and half-life
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// algorithms provide equivalent results.
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//
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// The Value type does not take ΔT as a parameter since it relies
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// on a timer with nanosecond resolution. In a way, one could treat
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// this algorithm as operating on a ΔT of 1ns. Practically speaking,
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// the computation operates on non-discrete time intervals.
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//
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// [exponentially weighted moving averages (EWMAs)]: https://en.wikipedia.org/wiki/EWMA_chart
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// [half-life decay]: https://en.wikipedia.org/wiki/Half-life
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// [1]: https://en.wikipedia.org/wiki/Exponential_smoothing#%22Exponential%22_naming
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// [2]: https://en.wikipedia.org/wiki/Exponential_decay
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type Value struct {
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// HalfLife specifies how quickly the rate reacts to rate changes.
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//
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// Specifically, if there is currently a steady-state rate of
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// 0 events per second, and then immediately the rate jumped to
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// N events per second, then it will take HalfLife seconds until
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// the Value represents a rate of N/2 events per second and
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// 2*HalfLife seconds until the Value represents a rate of 3*N/4
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// events per second, and so forth. The rate represented by Value
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// will asymptotically approach N events per second over time.
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//
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// In order for Value to stably represent a steady-state rate,
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// the HalfLife should be larger than the average period between
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// calls to Value.Add.
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//
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// A zero or negative HalfLife is by default 1 second.
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HalfLife time.Duration
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mu sync.Mutex
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updated mono.Time
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value float64 // adjusted count of events
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}
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// halfLife returns the half-life period in seconds.
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func (r *Value) halfLife() float64 {
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if r.HalfLife <= 0 {
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return time.Second.Seconds()
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}
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return time.Duration(r.HalfLife).Seconds()
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}
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// Add records that n number of events just occurred,
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// which must be a finite and non-negative number.
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func (r *Value) Add(n float64) {
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r.mu.Lock()
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defer r.mu.Unlock()
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r.addNow(mono.Now(), n)
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}
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func (r *Value) addNow(now mono.Time, n float64) {
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if n < 0 || math.IsInf(n, 0) || math.IsNaN(n) {
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panic(fmt.Sprintf("invalid count %f; must be a finite, non-negative number", n))
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}
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r.value = r.valueNow(now) + n
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r.updated = now
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}
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// valueNow computes the number of events after some elapsed time.
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// The total count of events decay exponentially so that
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// the computed rate is biased towards recent history.
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func (r *Value) valueNow(now mono.Time) float64 {
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// This uses the half-life formula:
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// N(t) = N₀ · 2^-(t / t½)
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// where:
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// N(t) is the amount remaining after time t,
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// N₀ is the initial quantity, and
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// t½ is the half-life of the decaying quantity.
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//
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// See https://en.wikipedia.org/wiki/Half-life
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age := now.Sub(r.updated).Seconds()
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return r.value * math.Exp2(-age/r.halfLife())
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}
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// Rate computes the rate as events per second.
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func (r *Value) Rate() float64 {
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r.mu.Lock()
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defer r.mu.Unlock()
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return r.rateNow(mono.Now())
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}
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func (r *Value) rateNow(now mono.Time) float64 {
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// The stored value carries the units "events"
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// while we want to compute "events / second".
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//
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// In the trivial case where the events never decay,
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// the average rate can be computed by dividing the total events
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// by the total elapsed time since the start of the Value.
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// This works because the weight distribution is uniform such that
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// the weight of an event in the distant past is equal to
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// the weight of a recent event. This is not the case with
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// exponentially decaying weights, which complicates computation.
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//
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// Since our events are decaying, we can divide the number of events
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// by the total possible accumulated value, which we determine
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// by integrating the half-life formula from t=0 until t=∞,
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// assuming that N₀ is 1:
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// ∫ N(t) dt = t½ / ln(2)
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//
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// Recall that the integral of a curve is the area under a curve,
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// which carries the units of the X-axis multiplied by the Y-axis.
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// In our case this would be the units "events · seconds".
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// By normalizing N₀ to 1, the Y-axis becomes a unit-less quantity,
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// resulting in a integral unit of just "seconds".
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// Dividing the events by the integral quantity correctly produces
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// the units of "events / second".
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return r.valueNow(now) / r.normalizedIntegral()
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}
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// normalizedIntegral computes the quantity t½ / ln(2).
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// It carries the units of "seconds".
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func (r *Value) normalizedIntegral() float64 {
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return r.halfLife() / math.Ln2
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}
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