linearizability

Linearizability versus Serializability

In plain English, under linearizability, writes should appear to be instantaneous. Imprecisely, once a write completes, all later reads (where “later” is defined by wall-clock start time) should return the value of that write or the value of a later write. Once a read returns a particular value, all later reads should return that value or the value of a later write.

Linearizability for read and write operations is synonymous with the term “atomic consistency” and is the “C,” or “consistency,” in Gilbert and Lynch’s proof of the CAP Theorem. We say linearizability is composable (or “local”) because, if operations on each object in a system are linearizable, then all operations in the system are linearizable.

Serializability is the traditional “I,” or isolation, in ACID. If users’ transactions each preserve application correctness (“C,” or consistency, in ACID), a serializable execution also preserves correctness. Therefore, serializability is a mechanism for guaranteeing database correctness.

Unlike linearizability, serializability does not—by itself—impose any real-time constraints on the ordering of transactions. Serializability is also not composable. Serializability does not imply any kind of deterministic order—it simply requires that some equivalent serial execution exists.

Combining serializability and linearizability yields strict serializability: transaction behavior is equivalent to some serial execution, and the serial order corresponds to real time. For example, say I begin and commit transaction T1, which writes to item x, and you later begin and commit transaction T2, which reads from x. A database providing strict serializability for these transactions will place T1 before T2 in the serial ordering, and T2 will read T1’s write. A database providing serializability (but not strict serializability) could order T2 before T1.

As Herlihy and Wing note, “linearizability can be viewed as a special case of strict serializability where transactions are restricted to consist of a single operation applied to a single object.”