i have a problem as follow Given a tree with n nodes with unique value for each node and q queries as given two nodes a and b ,find Mex in the path from a to b for each query
(1<n,q<200000)
my solution is using Mo algorithm as mentioned Here. i can find the Mex either using segment tree or set with log(n) for each query,but i think it is a bit hard for my solution to be valid under this constraints .
is there another solution with a better time complexity ?
Auto comment: topic has been updated by Khalell (previous revision, new revision, compare).
Because of unique value for each node, I think you can for each k find the shotest path p[k] such that 0...k is all on the path p[k]. Then binary search for each query. Can be done with O((n+q) log n).
it is a great idea ,thanks a lot
https://codeforces.me/blog/entry/100910
I hope this will help you a bit!
it will,thanks
Have a look at CF 1930 H
The solution($$$O(n \cdot \log(n))$$$) to 1930 H would work even if you had updates in your problem.