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Автор Aakas_kumar, история, 10 месяцев назад, По-английски

Hi folk: I know it is not a very hard concept like HLD and merging in the trees and all but for the junta that is below specialist/people but it could give a great inside when you ask all pair sum problems it could be a subproblem of the hard and bigger problem.

here is code for O(n^2)

int sum=0; vector v(n); for(int i=0; i<n; i++){ for(int j= i+1; j<n; j++){ sum+= v[i]*v[j]; } }

so here is the code for the O(n)

int sum=0; int sq_sum=0; for(int i=0; i<n; i++){ sum+=v[i]; sq_sum+= v[i]*v[i]; } int ans = (sum*sum — sq_sum)/2 ; it may be a good concept

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Hello, this was explained in editorial of round 891, which was prepared by my team. Nevertheless, math is pretty neat if you know how to use it)

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It's nice algebra

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Hi! there's a nice visual representation of this

but this reminds me of a proof for why certain n^3 tree dp's are actually n^2

https://codeforces.net/blog/entry/69888#comment-543684

basically if we fix node v, and let a[i] = size of v's i'th-child's subtree, then blue area represents twice the # of operations of looping over all pairs of childs, and nodes in their subtrees.

then the red area represents # of operations done when recursing on v's childs (we inductively assume ith child takes a[i]^2 operations)

size of v's subtree = 1 + a[0] + a[1] + ... + a[n-1], and area of entire square = (a[0] + a[1] + ... + a[n-1])^2 and represents work done in v's subtree

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