Maximum Weight Increasing Subsequence

In the Longest Increasing Subsequence Problem if we change the length by weight i.e the length of each element Ai is 1 if we change it to Wi How can we do it in O(nlogn).

For Example For an array of 8 Elements

Elements 1 2 3 4 1 2 3 4
Weights 10 20 30 40 15 15 15 50

The maximum weight is 110.
I saw the solution to LIS on wikipedia but am unable to modify it to this problem.

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Still, we use `f[i]` denotes the max value we can get with a sequence end with `E[i]`.

So generally we have `for (int i = 1;i <= n;i++) f[i] = dp(i);` and initially `f[0] = 0;` and `E[0] = -INF;`

Now we shall calculate `f[i]` in `dp(i)` within `O(log(N))`.

in `dp(i)`, we shall find the max `f[j]` with `E[j] < E[i]` for all `0 <= j < i`. Here we can maintain a `Segment Tree`.

So `dp(i) = find_max(1,E[i]-1) + W[i]`(this takes `O(log)`), and for every f[i] already calculated, `update(E[i],f[i])`.

So the whole algorithm takes `(O(NlogN))`.

Tip: If `E[i]` varies in a very big range, it can be `Discretization`ed.

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