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192 lines
7.5 KiB
Go
192 lines
7.5 KiB
Go
// Copyright The OpenTelemetry Authors
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// SPDX-License-Identifier: Apache-2.0
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package exemplar // import "go.opentelemetry.io/otel/sdk/metric/internal/exemplar"
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import (
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"context"
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"math"
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"math/rand"
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"sync"
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"time"
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"go.opentelemetry.io/otel/attribute"
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)
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var (
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// rng is used to make sampling decisions.
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//
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// Do not use crypto/rand. There is no reason for the decrease in performance
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// given this is not a security sensitive decision.
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rng = rand.New(rand.NewSource(time.Now().UnixNano()))
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// Ensure concurrent safe access to rng and its underlying source.
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rngMu sync.Mutex
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)
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// random returns, as a float64, a uniform pseudo-random number in the open
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// interval (0.0,1.0).
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func random() float64 {
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// TODO: This does not return a uniform number. rng.Float64 returns a
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// uniformly random int in [0,2^53) that is divided by 2^53. Meaning it
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// returns multiples of 2^-53, and not all floating point numbers between 0
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// and 1 (i.e. for values less than 2^-4 the 4 last bits of the significand
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// are always going to be 0).
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//
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// An alternative algorithm should be considered that will actually return
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// a uniform number in the interval (0,1). For example, since the default
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// rand source provides a uniform distribution for Int63, this can be
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// converted following the prototypical code of Mersenne Twister 64 (Takuji
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// Nishimura and Makoto Matsumoto:
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// http://www.math.sci.hiroshima-u.ac.jp/m-mat/MT/VERSIONS/C-LANG/mt19937-64.c)
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//
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// (float64(rng.Int63()>>11) + 0.5) * (1.0 / 4503599627370496.0)
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//
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// There are likely many other methods to explore here as well.
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rngMu.Lock()
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defer rngMu.Unlock()
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f := rng.Float64()
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for f == 0 {
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f = rng.Float64()
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}
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return f
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}
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// FixedSize returns a [Reservoir] that samples at most k exemplars. If there
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// are k or less measurements made, the Reservoir will sample each one. If
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// there are more than k, the Reservoir will then randomly sample all
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// additional measurement with a decreasing probability.
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func FixedSize(k int) Reservoir {
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r := &randRes{storage: newStorage(k)}
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r.reset()
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return r
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}
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type randRes struct {
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*storage
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// count is the number of measurement seen.
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count int64
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// next is the next count that will store a measurement at a random index
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// once the reservoir has been filled.
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next int64
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// w is the largest random number in a distribution that is used to compute
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// the next next.
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w float64
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}
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func (r *randRes) Offer(ctx context.Context, t time.Time, n Value, a []attribute.KeyValue) {
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// The following algorithm is "Algorithm L" from Li, Kim-Hung (4 December
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// 1994). "Reservoir-Sampling Algorithms of Time Complexity
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// O(n(1+log(N/n)))". ACM Transactions on Mathematical Software. 20 (4):
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// 481–493 (https://dl.acm.org/doi/10.1145/198429.198435).
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//
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// A high-level overview of "Algorithm L":
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// 0) Pre-calculate the random count greater than the storage size when
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// an exemplar will be replaced.
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// 1) Accept all measurements offered until the configured storage size is
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// reached.
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// 2) Loop:
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// a) When the pre-calculate count is reached, replace a random
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// existing exemplar with the offered measurement.
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// b) Calculate the next random count greater than the existing one
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// which will replace another exemplars
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//
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// The way a "replacement" count is computed is by looking at `n` number of
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// independent random numbers each corresponding to an offered measurement.
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// Of these numbers the smallest `k` (the same size as the storage
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// capacity) of them are kept as a subset. The maximum value in this
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// subset, called `w` is used to weight another random number generation
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// for the next count that will be considered.
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//
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// By weighting the next count computation like described, it is able to
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// perform a uniformly-weighted sampling algorithm based on the number of
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// samples the reservoir has seen so far. The sampling will "slow down" as
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// more and more samples are offered so as to reduce a bias towards those
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// offered just prior to the end of the collection.
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//
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// This algorithm is preferred because of its balance of simplicity and
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// performance. It will compute three random numbers (the bulk of
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// computation time) for each item that becomes part of the reservoir, but
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// it does not spend any time on items that do not. In particular it has an
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// asymptotic runtime of O(k(1 + log(n/k)) where n is the number of
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// measurements offered and k is the reservoir size.
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//
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// See https://en.wikipedia.org/wiki/Reservoir_sampling for an overview of
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// this and other reservoir sampling algorithms. See
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// https://github.com/MrAlias/reservoir-sampling for a performance
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// comparison of reservoir sampling algorithms.
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if int(r.count) < cap(r.store) {
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r.store[r.count] = newMeasurement(ctx, t, n, a)
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} else {
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if r.count == r.next {
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// Overwrite a random existing measurement with the one offered.
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idx := int(rng.Int63n(int64(cap(r.store))))
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r.store[idx] = newMeasurement(ctx, t, n, a)
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r.advance()
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}
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}
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r.count++
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}
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// reset resets r to the initial state.
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func (r *randRes) reset() {
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// This resets the number of exemplars known.
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r.count = 0
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// Random index inserts should only happen after the storage is full.
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r.next = int64(cap(r.store))
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// Initial random number in the series used to generate r.next.
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//
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// This is set before r.advance to reset or initialize the random number
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// series. Without doing so it would always be 0 or never restart a new
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// random number series.
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//
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// This maps the uniform random number in (0,1) to a geometric distribution
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// over the same interval. The mean of the distribution is inversely
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// proportional to the storage capacity.
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r.w = math.Exp(math.Log(random()) / float64(cap(r.store)))
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r.advance()
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}
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// advance updates the count at which the offered measurement will overwrite an
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// existing exemplar.
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func (r *randRes) advance() {
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// Calculate the next value in the random number series.
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//
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// The current value of r.w is based on the max of a distribution of random
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// numbers (i.e. `w = max(u_1,u_2,...,u_k)` for `k` equal to the capacity
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// of the storage and each `u` in the interval (0,w)). To calculate the
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// next r.w we use the fact that when the next exemplar is selected to be
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// included in the storage an existing one will be dropped, and the
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// corresponding random number in the set used to calculate r.w will also
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// be replaced. The replacement random number will also be within (0,w),
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// therefore the next r.w will be based on the same distribution (i.e.
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// `max(u_1,u_2,...,u_k)`). Therefore, we can sample the next r.w by
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// computing the next random number `u` and take r.w as `w * u^(1/k)`.
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r.w *= math.Exp(math.Log(random()) / float64(cap(r.store)))
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// Use the new random number in the series to calculate the count of the
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// next measurement that will be stored.
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//
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// Given 0 < r.w < 1, each iteration will result in subsequent r.w being
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// smaller. This translates here into the next next being selected against
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// a distribution with a higher mean (i.e. the expected value will increase
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// and replacements become less likely)
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//
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// Important to note, the new r.next will always be at least 1 more than
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// the last r.next.
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r.next += int64(math.Log(random())/math.Log(1-r.w)) + 1
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}
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func (r *randRes) Collect(dest *[]Exemplar) {
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r.storage.Collect(dest)
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// Call reset here even though it will reset r.count and restart the random
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// number series. This will persist any old exemplars as long as no new
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// measurements are offered, but it will also prioritize those new
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// measurements that are made over the older collection cycle ones.
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r.reset()
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}
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