Version 1.0, May 9th 2013
By: Henry Robinson / [email protected] / @henryr
http://the-paper-trail.org/
No subject appears to be more controversial to distributed systems engineers than the oft-quoted, oft-misunderstood CAP theorem. The purpose of this FAQ is to explain what is known about CAP, so as to help those new to the theorem get up to speed quickly, and to settle some common misconceptions or points of disagreement.
Of course, there's every possibility I've made superficial or completely thorough mistakes here. Corrections and comments are welcome: let me have them.
There are some questions I still intend to answer. For example
Please suggest more.
Dr. Eric Brewer gave a keynote speech at the Principles of Distributed Computing conference in 2000 called 'Towards Robust Distributed Systems' [1]. In it he posed his 'CAP Theorem' - at the time unproven - which illustrated the tensions between being correct and being always available in distributed systems.
Two years later, Seth Gilbert and Professor Nancy Lynch - researchers in distributed systems at MIT - formalised and proved the conjecture in their paper “Brewer's conjecture and the feasibility of consistent, available, partition-tolerant web services” [2].
[1] http://www.cs.berkeley.edu/~brewer/cs262b-2004/PODC-keynote.pdf [2]http://lpd.epfl.ch/sgilbert/pubs/BrewersConjecture-SigAct.pdf
The CAP Theorem (henceforth 'CAP') says that it is impossible to build an implementation of read-write storage in an asynchronous network that satisfies all of the following three properties:
The next few items define any unfamiliar terms.
More informally, the CAP theorem tells us that we can't build a database that both responds to every request and returns the results that you would expect every time. It's an impossibility result - it tells us that something we might want to do is actually provably out of reach. It's important now because it is directly applicable to the many, many distributed systems which have been and are being built in the last few years, but it is not a death knell: it does notmean that we cannot build useful systems while working within these constraints.
The devil is in the details however. Before you start crying 'yes, but what about...', make sure you understand the following about exactly what the CAP theorem does and does not allow.
CAP specifically concerns itself with a theoretical construct called a register. A register is a data structure with two operations:
A key-value store can be modelled as a collection of registers. Even though registers appear very simple, they capture the essence of what many distributed systems want to do - write data and read it back.
Atomic, or linearizable, consistency is a guarantee about what values it's ok to return when a client performs get() operations. The idea is that the register appears to all clients as though it ran on just one machine, and responded to operations in the order they arrive.
Consider an execution consisting the total set of operations performed by all clients, potentially concurrently. The results of those operations must, under atomic consistency, be equivalent to a single serial (in order, one after the other) execution of all operations.
This guarantee is very strong. It rules out, amongst other guarantees, someeventually consistent executions, which might allow a delay before a write becomes visible. So under EC, you might have:
set(10), set(5), get() = 10
But this execution is invalid under atomic consistency. (All linearizable histories are eventually consistent, but the converse is not true).
Atomic consistency also ensures that external communication about the value of a register is respected. That is, if I read X and tell you about it, you can go to the register and read X for yourself. It's possible under slightly weaker guarantees (_serializability_ for example) for that not to be true. In the following we write A: to mean that client A executes the following operation.
B:set(5), A:set(10), A:get() = 10, B:get() = 10
This is an atomic history. But the following is not:
B:set(5), A:set(10), A:get() = 10, B:get() = 5
even though it is equivalent to the following serial history:
B:set(5), B:get() = 5, A:set(10), A:get() = 10
In the second example, if A tells B about the value of the register (10) after it does its get(), B will falsely believe that some third-party has written 5 between A:get() and B:get(). If external communication isn't allowed, B cannot know about A:set, and so sees a consistent view of the register state; it's as if B:get really did happen before A:set.
Wikipedia [1] has more information. Maurice Herlihy's original paper from 1990 is available at [2].
[1] http://en.wikipedia.org/wiki/Linearizability [2]http://cs.brown.edu/~mph/HerlihyW90/p463-herlihy.pdf
An asynchronous network is one in which there is no bound on how long messages may take to be delivered by the network or processed by a machine. The important consequence of this property is that there's no way to distinguish between a machine that has failed, and one whose messages are getting delayed.
A data store is available if and only if all get and set requests eventually return a response that's part of their specification. This does not permit error responses, since a system could be trivially available by always returning an error.
There is no requirement for a fixed time bound on the response, so the system can take as long as it likes to process a request. But the system must eventually respond.
Notice how this is both a strong and a weak requirement. It's strong because 100% of the requests must return a response (there's no 'degree of availability' here), but weak because the response can take an unbounded (but finite) amount of time.
A partition is when the network fails to deliver some messages to one or more nodes by losing them (not by delaying them - eventual delivery is not a partition).
The term is sometimes used to refer to a period during which no messages are delivered between two sets of nodes. This is a more restrictive failure model. We'll call these kinds of partitions total partitions.
The proof of CAP relied on a total partition. In practice, these are arguably the most likely since all messages may flow through one component; if that fails then message loss is usually total between two nodes.
The basic idea is that if a client writes to one side of a partition, any reads that go to the other side of that partition can't possibly know about the most recent write. Now you're faced with a choice: do you respond to the reads with potentially stale information, or do you wait (potentially forever) to hear from the other side of the partition and compromise availability?
This is a proof by construction - we demonstrate a single situation where a system cannot be consistent and available. One reason that CAP gets some press is that this constructed scenario is not completely unrealistic. It is not uncommon for a total partition to occur if networking equipment should fail.
CAP only guarantees that there is some circumstance in which a system must give up either C or A. Let's call that circumstance a critical condition. The theorem doesn't say anything about how likely that critical condition is. Both C and A are strong guarantees: they hold only if 100% of operations meet their requirements. A single inconsistent read, or unavailable write, invalidates either C or A. But until that critical condition is met, a system can be happily consistent and available and not contravene any known laws.
Since most distributed systems are long running, and may see millions of requests in their lifetime, CAP tells us to be cautious: there's a good chance that you'll realistically hit one of these critical conditions, and it's prudent to understand how your system will fail to meet either C or A.
Brewer's keynote, the Gilbert paper, and many other treatments, places C, A and P on an equal footing as desirable properties of an implementation and effectively say 'choose two!'. However, this is often considered to be a misleading presentation, since you cannot build - or choose! - 'partition tolerance': your system either might experience partitions or it won't.
CAP is better understood as describing the tradeoffs you have to make when you are building a system that may suffer partitions. In practice, this is every distributed system: there is no 100% reliable network. So (at least in the distributed context) there is no realistic CA system. You will potentially suffer partitions, therefore you must at some point compromise C or A.
Therefore it's arguably more instructive to rewrite the theorem as the following:
Possibility of Partitions => Not (C and A)
i.e. if your system may experience partitions, you can not always be C and A.
There are some systems that won't experience partitions - single-site databases, for example. These systems aren't generally relevant to the contexts in which CAP is most useful. If you describe your distributed database as 'CA', you are misunderstanding something.
A perhaps surprising result from the Gilbert paper is that no implementation of an atomic register in an asynchronous network can be available at all times, and consistent only when no messages are lost.
This result depends upon the asynchronous network property, the idea being that it is impossible to tell if a message has been dropped and therefore a node cannot wait indefinitely for a response while still maintaining availability, however if it responds too early it might be inconsistent.
Arguably, yes. Different networks have vastly differing characteristics.
If
then your network may be considered asynchronous.
Gilbert and Lynch also proved that in a partially-synchronous system, where nodes have shared but not synchronised clocks and there is a bound on the processing time of every message, that it is still impossible to implement available atomic storage.
However, the result from #10 does not hold in the partially-synchronous model; it is possible to implement atomic storage that is available all the time, and consistent when all messages are delivered.
The Fischer, Lynch and Patterson theorem ('FLP') (see [1] for a link to the paper and a proof explanation) is an extraordinary impossibility result from nearly thirty years ago, which determined that the problem of consensus - having all nodes agree on a common value - is unsolvable in general in asynchronous networks where one node might fail.
The FLP result is not directly related to CAP, although they are similar in some respects. Both are impossibility results about problems that may not be solved in distributed systems. The devil is in the details. Here are some of the ways in which FLP is different from CAP:
For a bit more on this topic, consult the blog post at [2].
[1] http://the-paper-trail.org/blog/a-brief-tour-of-flp-impossibility/ [2] http://the-paper-trail.org/blog/flp-and-cap-arent-the-same-thing/
It is possible to relax both consistency and availability guarantees from the strong requirements that CAP imposes and get useful systems. In fact, the whole point of CAP is that you must do this, and any system you have designed and built relaxes one or both of these guarantees. The onus is on you to figure out when, and how, this occurs.
Real systems choose to relax availability - in the case of systems for whom consistency is of the utmost importance, like ZooKeeper. Other systems, like Amazon's Dynamo, relax consistency in order to maintain high degrees of availability.
Once you weaken any of the assumptions made in the statement or proof of CAP, you have to start again when it comes to proving an impossibility result.
No. A 'failed' machine is usually excused the burden of having to respond to client requests. CAP does not allow any machines to fail (in that sense it is a strong result, since it shows impossibility without having any machines fail).
It is possible to prove a similar result about the impossibility of atomic storage in an asynchronous network when there are up to N-1 failures. This result has ramifications about the tradeoff between how many nodes you write to (which is a performance concern) and how fault tolerant you are (which is a reliability concern).
No: messages eventually get delivered to a slow machine, but they never get delivered to a totally partitioned one. However, slow machines play a significant role in making it very hard to distinguish between lost messages (or failed machines) and a slow machine. This difficulty is right at the heart of why CAP, FLP and other results are true.
No. You might have designed a system that is not heavily affected by it. That's good.
Ref: http://henryr.github.io/cap-faq/