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Distributed Snapshot. One-dollar bank. Let a $1 coin circulate in a network of a million banks. How can someone count the total $ in circulation? If not counted “properly,” then one may think the total $ in circulation to be one million. Major uses in - deadlock detection
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One-dollarbank Let a $1 coin circulate in a network of a million banks. How can someone count the total $ in circulation? If not counted “properly,” then one may think the total $ in circulation to be one million.
Major uses in - deadlock detection - termination detection - rollback recovery - global predicate computation Importance of snapshots
Example 1 • Suppose you want to take a picture of a scenic view • Your camera cannot fit the entire scene in one picture • Take several pictures • Combine them to get overall picture
Example 2 • Suppose you want to take a picture of basketball game • Your camera cannot fit the entire scene in one picture • Take several pictures • Combine them to get overall picture • Care needs to be taken to ensure that the several pictures you took are consistent • E.g., the same player cannot be in two places
Example: Distributed Systems • You want to take a picture (global snapshot) of the distributed system • You can take a picture (local snapshot) of one process at a time • Need to combine these local snapshots • Need for consistency
Example: Distributed Systems • Local snapshot • Can be viewed in terms of the last event on the process • When we combine such snapshots, we call it a global snapshot • Can be viewed in terms of the last event and all preceding events on a process • When we combine such snapshots, we call it a (global) cut
(aconsistent cutC) (b happened before a) b C Consistent cut A cut is a set of events. b g c a d P1 e m f P2 P3 k h i j Cut 1 Cut 2 (Not consistent) (Consistent)
Consistent snapshot The set of states immediately following a consistent cut forms a consistent snapshot of a distributed system. • A snapshot that is of practical interest is the most recent one. Let C1 and C2 be two consistent cuts and C1C2. Then C2 is more recent than C1. • Assumption: The cut lines do not go through any event
Consistent snapshot How to record a consistent snapshot? Note that 1. The recording must be non-invasive 2. Recording must be done on-the-fly. You cannot stop the system.
Works on a (1) strongly connected graph (2) each channel is FIFO. An initiator initiates the algorithm by sending out a marker ( ) Chandy-Lamport Algorithm
Initially every process is white. When a process receives a marker, it turns red if it has not already done so. Every action by a process, and every message sent by a process gets the color of that process. White and red processes
Step 1. In one atomic action, the initiator (a) Turns red (b) Records its own state (c) sends a marker along all outgoing channels Step 2. Every other process, upon receiving a marker for the first time (and before doing anything else) (a) Turns red (b) Records its own state (c) sends markers along all outgoing channels The algorithm terminates when (1) every process turns red, and (2) Every process has received a marker through each incoming channel. Two steps
Lemma 1. No red message is received in a white action. Why does it work?
Theorem. The global state recorded by Chandy-Lamport algorithm is equivalent to the ideal snapshot state SSS. Hint. A pair of actions (a, b) can be scheduled in any order, if there is no causal order between them, so (a; b) is equivalent to (b; a) Why does it work? All white All red SSS Easy conceptualization of the snapshot state
Why does it work? Let an observer observe the following actions: w[i] w[k] r[k] w[j] r[i] w[l] r[j] r[l] … w[i] w[k] w[j] r[k] r[i] w[l] r[j] r[l] … [Lemma 1] w[i] w[k] w[j] r[k] w[l] r[i] r[j] r[l] … [Lemma 1] w[i] w[k] w[j] w[l] r[k] r[i] r[j] r[l] … [done!] Recorded state
Understanding snapshot The observed state is a feasible state that is reachable from the initial configuration. It may not actually be visited during a specific execution. The final state of the original computation is always reachable from the observed state.
Discussions What good is a snapshot if that state has never been visited by the system? - It is relevant for the detection of stable predicates. - Useful for checkpointing.
Discussions What if the channels are not FIFO? Study how Lai-Yang algorithm works. It does not use any marker LY1. The initiator records its own state. When it needs to send a message m to another process, it sends a message (m, red). LY2. When a process receives a message (m, red), it records its state if it has not already done so, and then accepts the message m. Question 1. Why will it work? Question 1 Are there any limitations of this approach?
Another related problem Distributed snapshot = distributed read. Distributed reset = distributed write
Global state collection Some applications - computing network topology - termination detection - deadlock detection Chandy Lamport algorithm does a partial job. Each process collects a fragment of the global state, but these pieces have to be stitched together to form a global state. All to all broadcast can be achieved via computation similar to diffusing computation
Recall: Global State • The global state of a system consists of • One local state for each process • Contains all the messages sent and received upto a point in computation • A local state could be specified by the `last’ event on the respective process
Consistency in Global State • Consistent iff • If reception of any message is recorded in the global state then the corresponding send is also recorded • If global snapshot is consistent then what is the causal relation between the `last’ events of respective processes?
Revisit Dijkstra Safra Termination Detection Algorithm • Note that the token is collecting a global snapshot of the system • Can we see if it is consistent?
2 Phase Termination Detection • Maintain c.j similar to Dijkstra-Safra Termination Detection • But no color variable maintained
Application of Global State Detection • Termination detection • Checkpointing and recovery