600 lines
25 KiB
Markdown
600 lines
25 KiB
Markdown
---
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title: Query functions
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nav_title: Functions
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sort_rank: 3
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---
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# Functions
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Some functions have default arguments, e.g. `year(v=vector(time())
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instant-vector)`. This means that there is one argument `v` which is an instant
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vector, which if not provided it will default to the value of the expression
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`vector(time())`.
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_Notes about the experimental native histograms:_
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* Ingesting native histograms has to be enabled via a [feature
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flag](../feature_flags/#native-histograms). As long as no native histograms
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have been ingested into the TSDB, all functions will behave as usual.
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* Functions that do not explicitly mention native histograms in their
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documentation (see below) effectively treat a native histogram as a float
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sample of value 0. (This is confusing and will change before native
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histograms become a stable feature.)
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* Functions that do already act on native histograms might still change their
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behavior in the future.
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* If a function requires the same bucket layout between multiple native
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histograms it acts on, it will automatically convert them
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appropriately. (With the currently supported bucket schemas, that's always
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possible.)
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## `abs()`
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`abs(v instant-vector)` returns the input vector with all sample values converted to
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their absolute value.
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## `absent()`
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`absent(v instant-vector)` returns an empty vector if the vector passed to it
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has any elements (floats or native histograms) and a 1-element vector with the
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value 1 if the vector passed to it has no elements.
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This is useful for alerting on when no time series exist for a given metric name
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and label combination.
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```
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absent(nonexistent{job="myjob"})
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# => {job="myjob"}
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absent(nonexistent{job="myjob",instance=~".*"})
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# => {job="myjob"}
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absent(sum(nonexistent{job="myjob"}))
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# => {}
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```
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In the first two examples, `absent()` tries to be smart about deriving labels
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of the 1-element output vector from the input vector.
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## `absent_over_time()`
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`absent_over_time(v range-vector)` returns an empty vector if the range vector
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passed to it has any elements (floats or native histograms) and a 1-element
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vector with the value 1 if the range vector passed to it has no elements.
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This is useful for alerting on when no time series exist for a given metric name
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and label combination for a certain amount of time.
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```
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absent_over_time(nonexistent{job="myjob"}[1h])
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# => {job="myjob"}
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absent_over_time(nonexistent{job="myjob",instance=~".*"}[1h])
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# => {job="myjob"}
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absent_over_time(sum(nonexistent{job="myjob"})[1h:])
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# => {}
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```
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In the first two examples, `absent_over_time()` tries to be smart about deriving
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labels of the 1-element output vector from the input vector.
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## `ceil()`
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`ceil(v instant-vector)` rounds the sample values of all elements in `v` up to
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the nearest integer.
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## `changes()`
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For each input time series, `changes(v range-vector)` returns the number of
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times its value has changed within the provided time range as an instant
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vector.
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## `clamp()`
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`clamp(v instant-vector, min scalar, max scalar)`
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clamps the sample values of all elements in `v` to have a lower limit of `min` and an upper limit of `max`.
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Special cases:
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- Return an empty vector if `min > max`
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- Return `NaN` if `min` or `max` is `NaN`
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## `clamp_max()`
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`clamp_max(v instant-vector, max scalar)` clamps the sample values of all
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elements in `v` to have an upper limit of `max`.
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## `clamp_min()`
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`clamp_min(v instant-vector, min scalar)` clamps the sample values of all
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elements in `v` to have a lower limit of `min`.
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## `day_of_month()`
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`day_of_month(v=vector(time()) instant-vector)` returns the day of the month
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for each of the given times in UTC. Returned values are from 1 to 31.
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## `day_of_week()`
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`day_of_week(v=vector(time()) instant-vector)` returns the day of the week for
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each of the given times in UTC. Returned values are from 0 to 6, where 0 means
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Sunday etc.
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## `day_of_year()`
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`day_of_year(v=vector(time()) instant-vector)` returns the day of the year for
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each of the given times in UTC. Returned values are from 1 to 365 for non-leap years,
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and 1 to 366 in leap years.
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## `days_in_month()`
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`days_in_month(v=vector(time()) instant-vector)` returns number of days in the
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month for each of the given times in UTC. Returned values are from 28 to 31.
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## `delta()`
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`delta(v range-vector)` calculates the difference between the
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first and last value of each time series element in a range vector `v`,
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returning an instant vector with the given deltas and equivalent labels.
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The delta is extrapolated to cover the full time range as specified in
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the range vector selector, so that it is possible to get a non-integer
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result even if the sample values are all integers.
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The following example expression returns the difference in CPU temperature
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between now and 2 hours ago:
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```
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delta(cpu_temp_celsius{host="zeus"}[2h])
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```
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`delta` acts on native histograms by calculating a new histogram where each
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compononent (sum and count of observations, buckets) is the difference between
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the respective component in the first and last native histogram in
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`v`. However, each element in `v` that contains a mix of float and native
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histogram samples within the range, will be missing from the result vector.
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`delta` should only be used with gauges and native histograms where the
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components behave like gauges (so-called gauge histograms).
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## `deriv()`
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`deriv(v range-vector)` calculates the per-second derivative of the time series in a range
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vector `v`, using [simple linear regression](https://en.wikipedia.org/wiki/Simple_linear_regression).
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The range vector must have at least two samples in order to perform the calculation. When `+Inf` or
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`-Inf` are found in the range vector, the slope and offset value calculated will be `NaN`.
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`deriv` should only be used with gauges.
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## `exp()`
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`exp(v instant-vector)` calculates the exponential function for all elements in `v`.
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Special cases are:
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* `Exp(+Inf) = +Inf`
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* `Exp(NaN) = NaN`
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## `floor()`
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`floor(v instant-vector)` rounds the sample values of all elements in `v` down
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to the nearest integer.
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## `histogram_count()` and `histogram_sum()`
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_Both functions only act on native histograms, which are an experimental
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feature. The behavior of these functions may change in future versions of
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Prometheus, including their removal from PromQL._
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`histogram_count(v instant-vector)` returns the count of observations stored in
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a native histogram. Samples that are not native histograms are ignored and do
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not show up in the returned vector.
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Similarly, `histogram_sum(v instant-vector)` returns the sum of observations
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stored in a native histogram.
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Use `histogram_count` in the following way to calculate a rate of observations
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(in this case corresponding to “requests per second”) from a native histogram:
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histogram_count(rate(http_request_duration_seconds[10m]))
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The additional use of `histogram_sum` enables the calculation of the average of
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observed values (in this case corresponding to “average request duration”):
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histogram_sum(rate(http_request_duration_seconds[10m]))
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/
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histogram_count(rate(http_request_duration_seconds[10m]))
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## `histogram_fraction()`
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_This function only acts on native histograms, which are an experimental
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feature. The behavior of this function may change in future versions of
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Prometheus, including its removal from PromQL._
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For a native histogram, `histogram_fraction(lower scalar, upper scalar, v
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instant-vector)` returns the estimated fraction of observations between the
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provided lower and upper values. Samples that are not native histograms are
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ignored and do not show up in the returned vector.
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For example, the following expression calculates the fraction of HTTP requests
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over the last hour that took 200ms or less:
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histogram_fraction(0, 0.2, rate(http_request_duration_seconds[1h]))
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The error of the estimation depends on the resolution of the underlying native
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histogram and how closely the provided boundaries are aligned with the bucket
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boundaries in the histogram.
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`+Inf` and `-Inf` are valid boundary values. For example, if the histogram in
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the expression above included negative observations (which shouldn't be the
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case for request durations), the appropriate lower boundary to include all
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observations less than or equal 0.2 would be `-Inf` rather than `0`.
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Whether the provided boundaries are inclusive or exclusive is only relevant if
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the provided boundaries are precisely aligned with bucket boundaries in the
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underlying native histogram. In this case, the behavior depends on the schema
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definition of the histogram. The currently supported schemas all feature
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inclusive upper boundaries and exclusive lower boundaries for positive values
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(and vice versa for negative values). Without a precise alignment of
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boundaries, the function uses linear interpolation to estimate the
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fraction. With the resulting uncertainty, it becomes irrelevant if the
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boundaries are inclusive or exclusive.
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## `histogram_quantile()`
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`histogram_quantile(φ scalar, b instant-vector)` calculates the φ-quantile (0 ≤
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φ ≤ 1) from a [conventional
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histogram](https://prometheus.io/docs/concepts/metric_types/#histogram) or from
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a native histogram. (See [histograms and
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summaries](https://prometheus.io/docs/practices/histograms) for a detailed
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explanation of φ-quantiles and the usage of the (conventional) histogram metric
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type in general.)
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_Note that native histograms are an experimental feature. The behavior of this
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function when dealing with native histograms may change in future versions of
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Prometheus._
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The conventional float samples in `b` are considered the counts of observations
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in each bucket of one or more conventional histograms. Each float sample must
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have a label `le` where the label value denotes the inclusive upper bound of
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the bucket. (Float samples without such a label are silently ignored.) The
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other labels and the metric name are used to identify the buckets belonging to
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each conventional histogram. The [histogram metric
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type](https://prometheus.io/docs/concepts/metric_types/#histogram)
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automatically provides time series with the `_bucket` suffix and the
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appropriate labels.
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The native histogram samples in `b` are treated each individually as a separate
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histogram to calculate the quantile from.
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As long as no naming collisions arise, `b` may contain a mix of conventional
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and native histograms.
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Use the `rate()` function to specify the time window for the quantile
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calculation.
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Example: A histogram metric is called `http_request_duration_seconds` (and
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therefore the metric name for the buckets of a conventional histogram is
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`http_request_duration_seconds_bucket`). To calculate the 90th percentile of request
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durations over the last 10m, use the following expression in case
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`http_request_duration_seconds` is a conventional histogram:
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histogram_quantile(0.9, rate(http_request_duration_seconds_bucket[10m]))
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For a native histogram, use the following expression instead:
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histogram_quantile(0.9, rate(http_request_duration_seconds[10m]))
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The quantile is calculated for each label combination in
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`http_request_duration_seconds`. To aggregate, use the `sum()` aggregator
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around the `rate()` function. Since the `le` label is required by
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`histogram_quantile()` to deal with conventional histograms, it has to be
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included in the `by` clause. The following expression aggregates the 90th
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percentile by `job` for conventional histograms:
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histogram_quantile(0.9, sum by (job, le) (rate(http_request_duration_seconds_bucket[10m])))
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When aggregating native histograms, the expression simplifies to:
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histogram_quantile(0.9, sum by (job) (rate(http_request_duration_seconds[10m])))
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To aggregate all conventional histograms, specify only the `le` label:
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histogram_quantile(0.9, sum by (le) (rate(http_request_duration_seconds_bucket[10m])))
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With native histograms, aggregating everything works as usual without any `by` clause:
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histogram_quantile(0.9, sum(rate(http_request_duration_seconds[10m])))
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The `histogram_quantile()` function interpolates quantile values by
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assuming a linear distribution within a bucket.
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If `b` has 0 observations, `NaN` is returned. For φ < 0, `-Inf` is
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returned. For φ > 1, `+Inf` is returned. For φ = `NaN`, `NaN` is returned.
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The following is only relevant for conventional histograms: If `b` contains
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fewer than two buckets, `NaN` is returned. The highest bucket must have an
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upper bound of `+Inf`. (Otherwise, `NaN` is returned.) If a quantile is located
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in the highest bucket, the upper bound of the second highest bucket is
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returned. A lower limit of the lowest bucket is assumed to be 0 if the upper
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bound of that bucket is greater than
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0. In that case, the usual linear interpolation is applied within that
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bucket. Otherwise, the upper bound of the lowest bucket is returned for
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quantiles located in the lowest bucket.
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## `holt_winters()`
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`holt_winters(v range-vector, sf scalar, tf scalar)` produces a smoothed value
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for time series based on the range in `v`. The lower the smoothing factor `sf`,
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the more importance is given to old data. The higher the trend factor `tf`, the
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more trends in the data is considered. Both `sf` and `tf` must be between 0 and
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1.
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`holt_winters` should only be used with gauges.
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## `hour()`
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`hour(v=vector(time()) instant-vector)` returns the hour of the day
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for each of the given times in UTC. Returned values are from 0 to 23.
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## `idelta()`
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`idelta(v range-vector)` calculates the difference between the last two samples
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in the range vector `v`, returning an instant vector with the given deltas and
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equivalent labels.
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`idelta` should only be used with gauges.
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## `increase()`
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`increase(v range-vector)` calculates the increase in the
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time series in the range vector. Breaks in monotonicity (such as counter
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resets due to target restarts) are automatically adjusted for. The
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increase is extrapolated to cover the full time range as specified
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in the range vector selector, so that it is possible to get a
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non-integer result even if a counter increases only by integer
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increments.
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The following example expression returns the number of HTTP requests as measured
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over the last 5 minutes, per time series in the range vector:
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```
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increase(http_requests_total{job="api-server"}[5m])
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```
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`increase` acts on native histograms by calculating a new histogram where each
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compononent (sum and count of observations, buckets) is the increase between
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the respective component in the first and last native histogram in
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`v`. However, each element in `v` that contains a mix of float and native
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histogram samples within the range, will be missing from the result vector.
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`increase` should only be used with counters and native histograms where the
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components behave like counters. It is syntactic sugar for `rate(v)` multiplied
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by the number of seconds under the specified time range window, and should be
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used primarily for human readability. Use `rate` in recording rules so that
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increases are tracked consistently on a per-second basis.
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## `irate()`
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`irate(v range-vector)` calculates the per-second instant rate of increase of
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the time series in the range vector. This is based on the last two data points.
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Breaks in monotonicity (such as counter resets due to target restarts) are
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automatically adjusted for.
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The following example expression returns the per-second rate of HTTP requests
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looking up to 5 minutes back for the two most recent data points, per time
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series in the range vector:
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```
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irate(http_requests_total{job="api-server"}[5m])
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```
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`irate` should only be used when graphing volatile, fast-moving counters.
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Use `rate` for alerts and slow-moving counters, as brief changes
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in the rate can reset the `FOR` clause and graphs consisting entirely of rare
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spikes are hard to read.
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Note that when combining `irate()` with an
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[aggregation operator](operators.md#aggregation-operators) (e.g. `sum()`)
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or a function aggregating over time (any function ending in `_over_time`),
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always take a `irate()` first, then aggregate. Otherwise `irate()` cannot detect
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counter resets when your target restarts.
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## `label_join()`
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For each timeseries in `v`, `label_join(v instant-vector, dst_label string, separator string, src_label_1 string, src_label_2 string, ...)` joins all the values of all the `src_labels`
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using `separator` and returns the timeseries with the label `dst_label` containing the joined value.
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There can be any number of `src_labels` in this function.
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This example will return a vector with each time series having a `foo` label with the value `a,b,c` added to it:
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```
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label_join(up{job="api-server",src1="a",src2="b",src3="c"}, "foo", ",", "src1", "src2", "src3")
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```
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## `label_replace()`
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For each timeseries in `v`, `label_replace(v instant-vector, dst_label string, replacement string, src_label string, regex string)`
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matches the regular expression `regex` against the value of the label `src_label`. If it
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matches, the value of the label `dst_label` in the returned timeseries will be the expansion
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of `replacement`, together with the original labels in the input. Capturing groups in the
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regular expression can be referenced with `$1`, `$2`, etc. If the regular expression doesn't
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match then the timeseries is returned unchanged.
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This example will return timeseries with the values `a:c` at label `service` and `a` at label `foo`:
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```
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label_replace(up{job="api-server",service="a:c"}, "foo", "$1", "service", "(.*):.*")
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```
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## `ln()`
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`ln(v instant-vector)` calculates the natural logarithm for all elements in `v`.
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Special cases are:
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* `ln(+Inf) = +Inf`
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* `ln(0) = -Inf`
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* `ln(x < 0) = NaN`
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* `ln(NaN) = NaN`
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## `log2()`
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`log2(v instant-vector)` calculates the binary logarithm for all elements in `v`.
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The special cases are equivalent to those in `ln`.
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## `log10()`
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`log10(v instant-vector)` calculates the decimal logarithm for all elements in `v`.
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The special cases are equivalent to those in `ln`.
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## `minute()`
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`minute(v=vector(time()) instant-vector)` returns the minute of the hour for each
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of the given times in UTC. Returned values are from 0 to 59.
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## `month()`
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`month(v=vector(time()) instant-vector)` returns the month of the year for each
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of the given times in UTC. Returned values are from 1 to 12, where 1 means
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January etc.
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## `predict_linear()`
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`predict_linear(v range-vector, t scalar)` predicts the value of time series
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`t` seconds from now, based on the range vector `v`, using [simple linear
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regression](https://en.wikipedia.org/wiki/Simple_linear_regression).
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The range vector must have at least two samples in order to perform the
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calculation. When `+Inf` or `-Inf` are found in the range vector,
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the slope and offset value calculated will be `NaN`.
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`predict_linear` should only be used with gauges.
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## `rate()`
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`rate(v range-vector)` calculates the per-second average rate of increase of the
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time series in the range vector. Breaks in monotonicity (such as counter
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resets due to target restarts) are automatically adjusted for. Also, the
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calculation extrapolates to the ends of the time range, allowing for missed
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scrapes or imperfect alignment of scrape cycles with the range's time period.
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The following example expression returns the per-second rate of HTTP requests as measured
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over the last 5 minutes, per time series in the range vector:
|
|
|
|
```
|
|
rate(http_requests_total{job="api-server"}[5m])
|
|
```
|
|
|
|
`rate` acts on native histograms by calculating a new histogram where each
|
|
compononent (sum and count of observations, buckets) is the rate of increase
|
|
between the respective component in the first and last native histogram in
|
|
`v`. However, each element in `v` that contains a mix of float and native
|
|
histogram samples within the range, will be missing from the result vector.
|
|
|
|
`rate` should only be used with counters and native histograms where the
|
|
components behave like counters. It is best suited for alerting, and for
|
|
graphing of slow-moving counters.
|
|
|
|
Note that when combining `rate()` with an aggregation operator (e.g. `sum()`)
|
|
or a function aggregating over time (any function ending in `_over_time`),
|
|
always take a `rate()` first, then aggregate. Otherwise `rate()` cannot detect
|
|
counter resets when your target restarts.
|
|
|
|
## `resets()`
|
|
|
|
For each input time series, `resets(v range-vector)` returns the number of
|
|
counter resets within the provided time range as an instant vector. Any
|
|
decrease in the value between two consecutive samples is interpreted as a
|
|
counter reset.
|
|
|
|
`resets` should only be used with counters.
|
|
|
|
## `round()`
|
|
|
|
`round(v instant-vector, to_nearest=1 scalar)` rounds the sample values of all
|
|
elements in `v` to the nearest integer. Ties are resolved by rounding up. The
|
|
optional `to_nearest` argument allows specifying the nearest multiple to which
|
|
the sample values should be rounded. This multiple may also be a fraction.
|
|
|
|
## `scalar()`
|
|
|
|
Given a single-element input vector, `scalar(v instant-vector)` returns the
|
|
sample value of that single element as a scalar. If the input vector does not
|
|
have exactly one element, `scalar` will return `NaN`.
|
|
|
|
## `sgn()`
|
|
|
|
`sgn(v instant-vector)` returns a vector with all sample values converted to their sign, defined as this: 1 if v is positive, -1 if v is negative and 0 if v is equal to zero.
|
|
|
|
## `sort()`
|
|
|
|
`sort(v instant-vector)` returns vector elements sorted by their sample values,
|
|
in ascending order.
|
|
|
|
## `sort_desc()`
|
|
|
|
Same as `sort`, but sorts in descending order.
|
|
|
|
## `sqrt()`
|
|
|
|
`sqrt(v instant-vector)` calculates the square root of all elements in `v`.
|
|
|
|
## `time()`
|
|
|
|
`time()` returns the number of seconds since January 1, 1970 UTC. Note that
|
|
this does not actually return the current time, but the time at which the
|
|
expression is to be evaluated.
|
|
|
|
## `timestamp()`
|
|
|
|
`timestamp(v instant-vector)` returns the timestamp of each of the samples of
|
|
the given vector as the number of seconds since January 1, 1970 UTC.
|
|
|
|
## `vector()`
|
|
|
|
`vector(s scalar)` returns the scalar `s` as a vector with no labels.
|
|
|
|
## `year()`
|
|
|
|
`year(v=vector(time()) instant-vector)` returns the year
|
|
for each of the given times in UTC.
|
|
|
|
## `<aggregation>_over_time()`
|
|
|
|
The following functions allow aggregating each series of a given range vector
|
|
over time and return an instant vector with per-series aggregation results:
|
|
|
|
* `avg_over_time(range-vector)`: the average value of all points in the specified interval.
|
|
* `min_over_time(range-vector)`: the minimum value of all points in the specified interval.
|
|
* `max_over_time(range-vector)`: the maximum value of all points in the specified interval.
|
|
* `sum_over_time(range-vector)`: the sum of all values in the specified interval.
|
|
* `count_over_time(range-vector)`: the count of all values in the specified interval.
|
|
* `quantile_over_time(scalar, range-vector)`: the φ-quantile (0 ≤ φ ≤ 1) of the values in the specified interval.
|
|
* `stddev_over_time(range-vector)`: the population standard deviation of the values in the specified interval.
|
|
* `stdvar_over_time(range-vector)`: the population standard variance of the values in the specified interval.
|
|
* `last_over_time(range-vector)`: the most recent point value in specified interval.
|
|
* `present_over_time(range-vector)`: the value 1 for any series in the specified interval.
|
|
|
|
Note that all values in the specified interval have the same weight in the
|
|
aggregation even if the values are not equally spaced throughout the interval.
|
|
|
|
## Trigonometric Functions
|
|
|
|
The trigonometric functions work in radians:
|
|
|
|
- `acos(v instant-vector)`: calculates the arccosine of all elements in `v` ([special cases](https://pkg.go.dev/math#Acos)).
|
|
- `acosh(v instant-vector)`: calculates the inverse hyperbolic cosine of all elements in `v` ([special cases](https://pkg.go.dev/math#Acosh)).
|
|
- `asin(v instant-vector)`: calculates the arcsine of all elements in `v` ([special cases](https://pkg.go.dev/math#Asin)).
|
|
- `asinh(v instant-vector)`: calculates the inverse hyperbolic sine of all elements in `v` ([special cases](https://pkg.go.dev/math#Asinh)).
|
|
- `atan(v instant-vector)`: calculates the arctangent of all elements in `v` ([special cases](https://pkg.go.dev/math#Atan)).
|
|
- `atanh(v instant-vector)`: calculates the inverse hyperbolic tangent of all elements in `v` ([special cases](https://pkg.go.dev/math#Atanh)).
|
|
- `cos(v instant-vector)`: calculates the cosine of all elements in `v` ([special cases](https://pkg.go.dev/math#Cos)).
|
|
- `cosh(v instant-vector)`: calculates the hyperbolic cosine of all elements in `v` ([special cases](https://pkg.go.dev/math#Cosh)).
|
|
- `sin(v instant-vector)`: calculates the sine of all elements in `v` ([special cases](https://pkg.go.dev/math#Sin)).
|
|
- `sinh(v instant-vector)`: calculates the hyperbolic sine of all elements in `v` ([special cases](https://pkg.go.dev/math#Sinh)).
|
|
- `tan(v instant-vector)`: calculates the tangent of all elements in `v` ([special cases](https://pkg.go.dev/math#Tan)).
|
|
- `tanh(v instant-vector)`: calculates the hyperbolic tangent of all elements in `v` ([special cases](https://pkg.go.dev/math#Tanh)).
|
|
|
|
The following are useful for converting between degrees and radians:
|
|
|
|
- `deg(v instant-vector)`: converts radians to degrees for all elements in `v`.
|
|
- `pi()`: returns pi.
|
|
- `rad(v instant-vector)`: converts degrees to radians for all elements in `v`.
|