# What is an idempotent operation?

What is an idempotent operation?

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In computing, an idempotent operation is one that has no additional effect if it is called more than once with the same input parameters. For example, removing an item from a set can be considered an idempotent operation on the set.

In mathematics, an idempotent operation is one where f(f(x)) = f(x). For example, the abs() function is idempotent because abs(abs(x)) = abs(x) for all x.

These slightly different definitions can be reconciled by considering that x in the mathematical definition represents the state of an object, and f is an operation that may mutate that object. For example, consider the Python set and its discard method. The discard method removes an element from a set, and does nothing if the element does not exist. So:

has exactly the same effect as doing the same operation twice:

Idempotent operations are often used in the design of network protocols, where a request to perform an operation is guaranteed to happen at least once, but might also happen more than once. If the operation is idempotent, then there is no harm in performing the operation two or more times.

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The mathematical definition of idempotent is only superficially different. If you realize that an idempotent function with side effects also has an implicit parameter of the state of the interpreter/machine, then it is clear that the function is also idempotent in the strict mathematical sense. –  user57368 Jul 3 '09 at 2:25
The concept is, however, fairly common, and one that all programmers should understand. For example, in object oriented programming, methods have a pointer to "this" as an implicit parameter, which is in strict OOP languages like Java the full extent of the non-local variable state that can be modified directly (ie. without another method call). –  user57368 Jul 3 '09 at 2:37
@greg: there's no conceptual difference between the mathematics and computer science definition. Including side effects just means you consider the state of the world as an additional implicit parameter. You seem to be confusing idempotence with referential transparency. They are different concepts (although a function can be both). square(x) is referentially transparent but not idempotent. setting a stateful flag to true is idempotent but not referentially transparent. a pure function that multiplies by zero is both. –  mikera Mar 5 '12 at 8:32
I'm sorry to say, this is really a wrong and misleading answer, especially the first bit about the 'sq' function :( –  Sam Watkins Feb 6 '13 at 13:39
"It is somewhat unfortunate that in mathematics, the use of idempotent is slightly different": it is not slightly but completely different, as noted by @mikera. sq is not idempotent, abs is. I think it's quite unfortunate that such an authorative source of info as stackoverflow creates confusion where there was none before. –  Arend Nov 5 '13 at 12:28

no matter how many times you call the operation the result will be the same.

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I've heard idempotent defined as either or both of the below: 1) For a given set of inputs it will always return the same output. 2) Does not produce any side effects. My question is, if a function conforms to #1, but not #2, because it results in a side effect unrelated to the computation (logs the request to a data store, for example), is it still considered idempotent? –  Keith Bennett Jun 28 '12 at 22:32
The result of calling an operation must include the state of the system, so if the operation has some cumulative side effect it is not idempotent; however, if the side effect leaves the system in the same state no matter how many times the operation is called, then it may be idempotent. –  Robert Jul 17 '12 at 21:45

An idempotent operation leaves everything in the same state if you call it once or many times, provided you pass in the same parameters.

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It is any operation that every nth result will result in an output matching the value of the 1st result. For instance the absolute value of -1 is 1. The absolute value of the absolute value of -1 is 1. The absolute value of the absolute value of absolute value of -1 is 1. And so on.

See also: When would be a really silly time to use recursion?

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An idempotent operation over a set leaves its members unchanged when applied one or more times.

It can be a unary operation like absolute(x) where x belongs to a set of positive integers. Here absolute(absolute(x)) = x.

It can be a binary operation like union of a set with itself would always return the same set.

cheers

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An idempotent operation can be repeated an arbitrary number of times and the result will be the same as if it had been done only once. In arithmetic, adding zero to a number is idempotent.

Idempotence is talked about a lot in the context of "RESTful" web services. REST seeks to maximally leverage HTTP to give programs access to web content, and is usually set in contrast to SOAP-based web services, which just tunnel remote procedure call style services inside HTTP requests and responses.

REST organizes a web application into "resources" (like a Twitter user, or a Flickr image) and then uses the HTTP verbs of POST, PUT, GET, and DELETE to create, update, read, and delete those resources.

Idempotence plays an important role in REST. If you GET a representation of a REST resource (eg, GET a jpeg image from Flickr), and the operation fails, you can just repeat the GET again and again until the operation succeeds. To the web service, it doesn't matter how many times the image is gotten. Likewise, if you use a RESTful web service to update your Twitter account information, you can PUT the new information as many times as it takes in order to get confirmation from the web service. PUT-ing it a thousand times is the same as PUT-ing it once. Similarly DELETE-ing a REST resource a thousand times is the same as deleting it once. Idempotence thus makes it a lot easier to construct a web service that's resilient to communication errors.

Further reading: RESTful Web Services, by Richardson and Ruby (idempotence is discussed on page 103-104), and Roy Fielding's PhD dissertation on REST. Fielding was one of the authors of HTTP 1.1, RFC-2616, which talks about idempotence in section 9.1.2.

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Idempotence means that applying an operation once or applying it multiple times has the same effect.

Examples:

• Multiplication by zero. No matter how many times you do it, the result is still zero.
• Setting a boolean flag. No matter how many times you do it, the flag stays set.
• Deleting a row from a database with a given ID. If you try it again, the row is still gone.

For pure functions (functions with no side effects) then idempotency implies that f(x) = f(f(x)) = f(f(f(x))) = f(f(f(f(x)))) = ...... for all values of x

For functions with side effects, idempotency furthermore implies that no additional side effects will be caused after the first application. You can consider the state of the world to be an additional "hidden" parameter to the function if you like.

Note that in a world where you have concurrent actions going on, you may find that operations you thought were idempotent cease to be so (for example, another thread could unset the value of the boolean flag in the example above). Basically whenever you have concurrency and mutable state, you need to think much more carefully about idempotency.

Idempotency is often a useful property in building robust systems. For example, if there is a risk that you may receive a duplicate message from a third party, it is helpful to have the message handler act as an idempotent operation so that the message effect only happens once.

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Idempotent Operations: Operations that have no side-effects if executed multiple times.
Example: An operation that retrieves values from a data resource and say, prints it

Non-Idempotent Operations: Operations that would cause some harm if executed multiple times. (As they change some values or states)
Example: An operation that withdraws from a bank account

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Just wanted to throw out a real use case that demonstrates idempotence. In JavaScript, say you are defining a bunch of model classes (as in MVC model). The way this is often implemented is functionally equivalent to something like this (basic example):

function model(name) {
function Model() {
this.name = name;
}

return Model;
}

You could then define new classes like this:

var User = model('user');
var Article = model('article');

But if you were to try to get the User class via model('user'), from somewhere else in the code, it would fail:

var User = model('user');
// ... then somewhere else in the code (in a different scope)
var User = model('user');

Those two User constructors would be different. That is,

model('user') !== model('user');

To make it idempotent, you would just add some sort of caching mechanism, like this:

var collection = {};

function model(name) {
if (collection[name])
return collection[name];

function Model() {
this.name = name;
}

collection[name] = Model;
return Model;
}

By adding caching, every time you did model('user') it will be the same object, and so it's idempotent. So:

model('user') === model('user');
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my 5c: In integration and networking the idempotency is very important. Several examples from real-life: Imagine, we deliver data to the target system. Data delivered by a sequence of messages. 1. What would happen if the sequence is mixed in channel? (As network packages always do :) ). If the target system is idempotent, the result will not be different. If the target system depends of the right order in the sequence, we have to implement resequencer on the target site, which would restore the right order. 2. What would happen if there are the message duplicates? If the channel of target system does not acknowledge timely, the source system (or channel itself) usually sends another copy of the message. As a result we can have duplicate message on the target system side. If the target system is idempotent, it takes care of it and result will not be different. If the target system is not idempotent, we have to implement deduplicator on the target system side of the channel.

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