The least common ancestor of two nodes d and e in a rooted tree T is the node g that is an ancestor of both d and e and that has the greatest depth in T.
The off-line least common ancestors problem gives us a rooted tree T and a set P = {{d,e}} of unordered pairs of nodes in T.
Tarjan's off-line least common ancestors algorithm determines the least common ancestor of each pair in P.
An example of the algorithm:
TOLCA(u) { Make-set(u); ancestor[Find-Set(u)] <- u; for each child v in u in T do { TOLCA(v); Union(u,v); ancestor[Find-Set(u)] <- u; } colour[u] <- black; for each node v such that {u,v} in P do if (colour[v] = black) { print "Tarjan's Least Common Ancestor of" + u + " and " + v + " is " ancestor[Find-Set(v)]; } }
The following procedure assumes each node is white before coloured black.
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