Lamport timestamps

The algorithm of Lamport timestamps is a simple algorithm used to determine the order of events in a distributed computer system. As different nodes or processes will typically not be perfectly synchronized, this algorithm is used to provide a partial ordering of events with minimal overhead, and conceptually provide a starting point for the more advanced Vector clock method.

Distributed algorithms such as resource synchronization often depend on some method of ordering events to function. For example, consider a system with two processes and a disk. The processes send messages to each other, and also send messages to the disk requesting access. The disk grants access in the order the messages were sent. Now, imagine process 1 sends a message to the disk asking for access to write, and then sends a message to process 2 asking it to read. Process 2 receives the message, and as a result sends its own message to the disk. Now, due to some timing delay, the disk receives both messages at the same time: how does it determine which message happened-before the other? (A happens-before B if one can get from A to B by a sequence of moves of two types: moving forward while remaining in the same process, and following a message from its sending to its reception.) A logical clock algorithm provides a mechanism to determine facts about the order of such events.

Leslie Lamport invented a simple mechanism by which the happened-before ordering can be captured numerically. A Lamport logical clock is a monotonically incrementing software counter maintained in each process.

It follows some simple rules:

  1. A process increments its counter before each event in that process;
  2. When a process sends a message, it includes its counter value with the message;
  3. On receiving a message, the receiver process sets its counter to be greater than the maximum of its own value and the received value before it considers the message received.

Conceptually, this logical clock can be thought of as a clock that only has meaning in relation to messages moving between processes. When a process receives a message, it resynchronizes its logical clock with that sender.

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Considerations

For every two events a and b occurring in the same process, and C(x) being the timestamp for a certain event x, it is necessary that C(a) never equals C(b).

Therefore it is necessary that:

  1. The logical clock be set so that there is minimum of one clock "tick" (increment of the counter) between events a and b;
  2. In a multiprocess or multithreaded environment, it might be necessary to attach the process ID (PID) or any other unique ID to the timestamp so that it is possible to differentiate between events a and b which may occur simultaneously in different processes.

Implications

A Lamport clock may be used to create a partial causal ordering of events between processes. Given a logical clock following these rules, the following relation is true: if a \rightarrow b then C(a) < C(b), where \rightarrow\, means happened-before.

This relation only goes one way, and is called clock consistency condition: if one event comes before another, then that event's logical clock comes before the other's. The strong clock consistency condition, which is two way (if C(a) < C(b) then a \rightarrow b), can be obtained by other techniques such as vector clocks. Using only a simple Lamport clock, only a partial causal ordering can be inferred from the clock.

However, via the contrapositive, it's true that C(a) \nless C(b) implies a \nrightarrow b. So, for example, if C(a) \geq C(b) then a cannot have happened-before b.

Another way of putting this is that C(a) < C(b) means that a may have happened-before b, or be incomparable with b in the happened-before ordering, but a did not happen after b.

Nevertheless, Lamport timestamps can be used to create a total ordering of events in a distributed system by using some arbitrary mechanism to break ties (e.g. the ID of the process). The caveat is that this ordering is artifactual and cannot be depended on to imply a causal relationship.

Lamport's logical clock in distributed systems

See also

References