Hello those who are reading my entry, I have a small problem that i'm kinder curious about my solution.
***The problem is:
You have an array of integers (a[i]<=1e6) sized of n (n<=1e3). You have to split the array m different segment which cover the whole array. An action will take 1 unit of time which let you do 1 of those 2 at a time (each take 1 unit of time):
You can minus 1 from a[i]
You can plus 1 from a[i]
Your task is to mange to split the segments somehow that all of the value in 1 segment need to be the same by using those action i mention. And also those segment action work separately, which mean the answer would be the maximum action of 1 of those m segments.
Test Case:
Input:
6 2
1 1 2 3 4 3
Output:
1
Explain: 2 segments are 1 1 2 and 3 4 3, you can turn it into 1 1 1 and 3 3 3***
My idea:
Due to the fact that actions need for a subarray is going to be larger if it contains more value (or the subarray is larger) because the action we have to use is abs(a[i]-median) so base on the linear spec, we could use greedy to put as many as we could into a segment so that their action won't exceed the answer (cause we only focus about the max value).
I would use binary search to search for the answer, for each mid I search, I would check it for each segment as I mention to make sure that none of them could exceed by using 2 pointer L and R. For each L, I will find all the median in (L, R) and check to make sure the actions follow the rule by extend the R pointer to the furthest position (rightest what I mean).
And if everything is ok, then just print the answer. However, the time limit could be O(n^2*LogN^2), which mean 20*20*1000*1000 or 400 million calculations, may exceed 1 second limit. Forgot to mention, I use Persistent Data Structures to find the (r-l+1)/2 smallest value to find the median.
time limit: 1s
memory limit: 256mb