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[[search-aggregations-metrics-percentile-aggregation]]
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=== Percentiles Aggregation
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A `multi-value` metrics aggregation that calculates one or more percentiles
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over numeric values extracted from the aggregated documents. These values
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can be extracted either from specific numeric fields in the documents, or
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be generated by a provided script.
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Percentiles show the point at which a certain percentage of observed values
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occur. For example, the 95th percentile is the value which is greater than 95%
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of the observed values.
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Percentiles are often used to find outliers. In normal distributions, the
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0.13th and 99.87th percentiles represents three standard deviations from the
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mean. Any data which falls outside three standard deviations is often considered
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an anomaly.
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When a range of percentiles are retrieved, they can be used to estimate the
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data distribution and determine if the data is skewed, bimodal, etc.
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Assume your data consists of website load times. The average and median
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load times are not overly useful to an administrator. The max may be interesting,
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but it can be easily skewed by a single slow response.
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Let's look at a range of percentiles representing load time:
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[source,js]
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--------------------------------------------------
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{
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"aggs" : {
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"load_time_outlier" : {
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"percentiles" : {
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"field" : "load_time" <1>
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}
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}
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}
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}
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--------------------------------------------------
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<1> The field `load_time` must be a numeric field
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By default, the `percentile` metric will generate a range of
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percentiles: `[ 1, 5, 25, 50, 75, 95, 99 ]`. The response will look like this:
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[source,js]
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--------------------------------------------------
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{
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...
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"aggregations": {
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"load_time_outlier": {
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"values" : {
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"1.0": 15,
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"5.0": 20,
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"25.0": 23,
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"50.0": 25,
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"75.0": 29,
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"95.0": 60,
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"99.0": 150
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}
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}
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}
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}
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--------------------------------------------------
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As you can see, the aggregation will return a calculated value for each percentile
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in the default range. If we assume response times are in milliseconds, it is
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immediately obvious that the webpage normally loads in 15-30ms, but occasionally
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spikes to 60-150ms.
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Often, administrators are only interested in outliers -- the extreme percentiles.
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We can specify just the percents we are interested in (requested percentiles
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must be a value between 0-100 inclusive):
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[source,js]
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--------------------------------------------------
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{
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"aggs" : {
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"load_time_outlier" : {
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"percentiles" : {
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"field" : "load_time",
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"percents" : [95, 99, 99.9] <1>
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}
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}
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}
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}
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--------------------------------------------------
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<1> Use the `percents` parameter to specify particular percentiles to calculate
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==== Script
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The percentile metric supports scripting. For example, if our load times
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are in milliseconds but we want percentiles calculated in seconds, we could use
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a script to convert them on-the-fly:
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[source,js]
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--------------------------------------------------
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{
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"aggs" : {
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"load_time_outlier" : {
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"percentiles" : {
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"script" : "doc['load_time'].value / timeUnit", <1>
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"params" : {
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"timeUnit" : 1000 <2>
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}
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}
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}
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}
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}
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--------------------------------------------------
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<1> The `field` parameter is replaced with a `script` parameter, which uses the
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script to generate values which percentiles are calculated on
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<2> Scripting supports parameterized input just like any other script
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2014-06-06 10:25:21 -04:00
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[[search-aggregations-metrics-percentile-aggregation-approximation]]
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==== Percentiles are (usually) approximate
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There are many different algorithms to calculate percentiles. The naive
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implementation simply stores all the values in a sorted array. To find the 50th
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percentile, you simply find the value that is at `my_array[count(my_array) * 0.5]`.
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Clearly, the naive implementation does not scale -- the sorted array grows
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linearly with the number of values in your dataset. To calculate percentiles
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across potentially billions of values in an Elasticsearch cluster, _approximate_
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percentiles are calculated.
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The algorithm used by the `percentile` metric is called TDigest (introduced by
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Ted Dunning in
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https://github.com/tdunning/t-digest/blob/master/docs/t-digest-paper/histo.pdf[Computing Accurate Quantiles using T-Digests]).
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When using this metric, there are a few guidelines to keep in mind:
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- Accuracy is proportional to `q(1-q)`. This means that extreme percentiles (e.g. 99%)
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are more accurate than less extreme percentiles, such as the median
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- For small sets of values, percentiles are highly accurate (and potentially
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100% accurate if the data is small enough).
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- As the quantity of values in a bucket grows, the algorithm begins to approximate
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the percentiles. It is effectively trading accuracy for memory savings. The
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exact level of inaccuracy is difficult to generalize, since it depends on your
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data distribution and volume of data being aggregated
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2014-03-14 07:22:48 -04:00
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The following chart shows the relative error on a uniform distribution depending
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on the number of collected values and the requested percentile:
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image:images/percentiles_error.png[]
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It shows how precision is better for extreme percentiles. The reason why error diminishes
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for large number of values is that the law of large numbers makes the distribution of
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values more and more uniform and the t-digest tree can do a better job at summarizing
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it. It would not be the case on more skewed distributions.
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2014-06-06 10:25:21 -04:00
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[[search-aggregations-metrics-percentile-aggregation-compression]]
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==== Compression
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Approximate algorithms must balance memory utilization with estimation accuracy.
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This balance can be controlled using a `compression` parameter:
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[source,js]
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--------------------------------------------------
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{
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"aggs" : {
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"load_time_outlier" : {
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"percentiles" : {
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"field" : "load_time",
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"compression" : 200 <1>
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}
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}
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}
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}
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--------------------------------------------------
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<1> Compression controls memory usage and approximation error
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The TDigest algorithm uses a number of "nodes" to approximate percentiles -- the
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more nodes available, the higher the accuracy (and large memory footprint) proportional
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to the volume of data. The `compression` parameter limits the maximum number of
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nodes to `20 * compression`.
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Therefore, by increasing the compression value, you can increase the accuracy of
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your percentiles at the cost of more memory. Larger compression values also
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make the algorithm slower since the underlying tree data structure grows in size,
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resulting in more expensive operations. The default compression value is
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`100`.
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A "node" uses roughly 32 bytes of memory, so under worst-case scenarios (large amount
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of data which arrives sorted and in-order) the default settings will produce a
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TDigest roughly 64KB in size. In practice data tends to be more random and
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the TDigest will use less memory.
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