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I have an array of mutually different elements (x_1, x_2, ..., x_n). Every element has associated a positive value (w_1, w_2, ..., w_n). The sum of these positives values is 1.

condition1

I have to find an Optimal element (x_k), which is:

condition2

and

condition3

I find this algorithm:

proc OptimalElement(arr[])
 prevs_w := 0
 nexts_w := 0

 for (i = 0; i <= n; i++)
 {
   wi := arr[i].w

   nexts_w := 1 - prevs_w - wi

   IF (prevs_w < 0,5 && nexts_w <= 0,5) THEN
     return arr[i]
   ELSE
     prevs_w := prevs_w + wi
   ENDIF
 }
end

But this algorithm compare only sum of items which index is i < k and i > k. But I need algorithm that calculate sums of items which x_i < x_k and x_i > x_k.

An Algorithm should have work with O(n) time. Do you have any idea how to solve it? Thx for tips.

Example of input:

x_i | 1 ; 4 ; 2 ; 3 ; 5
w_i | 0,1 ; 0,2 ; 0,3 ; 0,2 ; 0,2

share|improve this question
    
One solution is here: csee.umbc.edu/~kalpakis/courses/441-sp03/hws/hw4-sol.pdf –  Pepa Zapletal Mar 20 '14 at 9:47
    
This question appears to be off-topic because it is about computer science, and should be migrated to cs.stackexchange.com –  Blazemonger Mar 24 '14 at 21:43

1 Answer 1

up vote 3 down vote accepted

You can use Quickselect:

  1. Select a pivot (randomly would be a good idea)
  2. Partition the array around that pivot according to their x coordinates, keeping track of the sum s of items you put to the left side of it
  3. If s ≥ 1/2, recurse into the left side. Else, recurse into the right side

The problem here is the run time is O(n²) in the worst case. However, it is O(n) on average (assuming the elements are somewhat evenly distributed). There are other partition-based selection algorithms with deterministic linear time which you can probably adapt in a similar way, but they are more complicated.

share|improve this answer
    
Algorithm Median of medians looks good. How can I use it? Do you have idea? –  Pepa Zapletal Mar 15 '14 at 11:34
    
No but you can try it yourself, and if you have a specific question, ask it on Stack Overflow –  Niklas B. Mar 15 '14 at 14:45

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