As a start, you can at least reduce the problem by computing the set symmetric difference to eliminate any triplets that do not occur in both sequences.

For the longest subsequence, the algorithm uses a dynamic programming approach. For each triplet, find the shortest substring of length two that occurs in both. Loop over those pairs, trying to extend them by combining the pairs. Keep extending until you have all the longest extensions for each triplet. Pick the longest of those:

```
ABQACBBA
ZBABBA
Eliminate symmetric difference
ABABBA and BABBA
Start with the first A in ABABBA.
It is followed by B, giving the elements [0,1]
Check to see if AB is in BABBA, and record a match at [1,2]
So, the first pair is ((0,1), (1,2))
Next, try the first B in ABABBA.
It is followed by an A giving the elements [1,2]
Check to see if BA is in BABBA and record a match at [0,1]
Continue with the rest of the letters in ABABBA.
Then, try extensions.
The first pair AB at [0,1] and [1,2] can be extended from BA
to ABA [0,1,3] and [1,2,4]. Note, the latter group is all the
way to the right so it cannot be extended farther. ABA cannot
be extended.
Continue until all sequences have extended are far as possible.
Keep only the best of those.
```