Write about the chain cover a little. (#13602)

Co-authored-by: Sean Quah <8349537+squahtx@users.noreply.github.com>
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Improve the description of the ["chain cover index"](https://matrix-org.github.io/synapse/latest/auth_chain_difference_algorithm.html) used internally by Synapse.

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@ -34,13 +34,45 @@ the process of indexing it).
## Chain Cover Index ## Chain Cover Index
Synapse computes auth chain differences by pre-computing a "chain cover" index Synapse computes auth chain differences by pre-computing a "chain cover" index
for the auth chain in a room, allowing efficient reachability queries like "is for the auth chain in a room, allowing us to efficiently make reachability queries
event A in the auth chain of event B". This is done by assigning every event a like "is event `A` in the auth chain of event `B`?". We could do this with an index
*chain ID* and *sequence number* (e.g. `(5,3)`), and having a map of *links* that tracks all pairs `(A, B)` such that `A` is in the auth chain of `B`. However, this
between chains (e.g. `(5,3) -> (2,4)`) such that A is reachable by B (i.e. `A` would be prohibitively large, scaling poorly as the room accumulates more state
is in the auth chain of `B`) if and only if either: events.
1. A and B have the same chain ID and `A`'s sequence number is less than `B`'s Instead, we break down the graph into *chains*. A chain is a subset of a DAG
with the following property: for any pair of events `E` and `F` in the chain,
the chain contains a path `E -> F` or a path `F -> E`. This forces a chain to be
linear (without forks), e.g. `E -> F -> G -> ... -> H`. Each event in the chain
is given a *sequence number* local to that chain. The oldest event `E` in the
chain has sequence number 1. If `E` has a child `F` in the chain, then `F` has
sequence number 2. If `E` has a grandchild `G` in the chain, then `G` has
sequence number 3; and so on.
Synapse ensures that each persisted event belongs to exactly one chain, and
tracks how the chains are connected to one another. This allows us to
efficiently answer reachability queries. Doing so uses less storage than
tracking reachability on an event-by-event basis, particularly when we have
fewer and longer chains. See
> Jagadish, H. (1990). [A compression technique to materialize transitive closure](https://doi.org/10.1145/99935.99944).
> *ACM Transactions on Database Systems (TODS)*, 15*(4)*, 558-598.
for the original idea or
> Y. Chen, Y. Chen, [An efficient algorithm for answering graph
> reachability queries](https://doi.org/10.1109/ICDE.2008.4497498),
> in: 2008 IEEE 24th International Conference on Data Engineering, April 2008,
> pp. 893902. (PDF available via [Google Scholar](https://scholar.google.com/scholar?q=Y.%20Chen,%20Y.%20Chen,%20An%20efficient%20algorithm%20for%20answering%20graph%20reachability%20queries,%20in:%202008%20IEEE%2024th%20International%20Conference%20on%20Data%20Engineering,%20April%202008,%20pp.%20893902.).)
for a more modern take.
In practical terms, the chain cover assigns every event a
*chain ID* and *sequence number* (e.g. `(5,3)`), and maintains a map of *links*
between events in chains (e.g. `(5,3) -> (2,4)`) such that `A` is reachable by `B`
(i.e. `A` is in the auth chain of `B`) if and only if either:
1. `A` and `B` have the same chain ID and `A`'s sequence number is less than `B`'s
sequence number; or sequence number; or
2. there is a link `L` between `B`'s chain ID and `A`'s chain ID such that 2. there is a link `L` between `B`'s chain ID and `A`'s chain ID such that
`L.start_seq_no` <= `B.seq_no` and `A.seq_no` <= `L.end_seq_no`. `L.start_seq_no` <= `B.seq_no` and `A.seq_no` <= `L.end_seq_no`.
@ -49,8 +81,9 @@ There are actually two potential implementations, one where we store links from
each chain to every other reachable chain (the transitive closure of the links each chain to every other reachable chain (the transitive closure of the links
graph), and one where we remove redundant links (the transitive reduction of the graph), and one where we remove redundant links (the transitive reduction of the
links graph) e.g. if we have chains `C3 -> C2 -> C1` then the link `C3 -> C1` links graph) e.g. if we have chains `C3 -> C2 -> C1` then the link `C3 -> C1`
would not be stored. Synapse uses the former implementations so that it doesn't would not be stored. Synapse uses the former implementation so that it doesn't
need to recurse to test reachability between chains. need to recurse to test reachability between chains. This trades-off extra storage
in order to save CPU cycles and DB queries.
### Example ### Example