Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I wrote the following code to find the contiguous subarray with maximum sum, which I tink pretty ugly:

The problem is my internal thinking of this problem (using DP) is imperative. How can I refactor this piece of code and make it more functional (and DRY)? Any recommendations on how to think algorithms in functional language? (maybe should be a sperate question though).

class Object
  def sum(lst)
    lst.reduce(:+)
  end
end

def dp_max_subarray(lst)
  i=0
  s=0
  while i<lst.length
    (i...lst.length).each do |j|
      t = sum lst[i..j]
      if t > s
        s= sum lst[i..j]
        next
      elsif t < 0
        i=j+1
        break
      end
    end
    i+=1
  end
  s
end
share|improve this question
    
IIRC, this can be solved with 1 loop (greedy), no DP. Converting the greedy solution to higher order programming can be done with foldl (not sure the equivalent in ruby) and a 2-tuple (pair), which stores the max sum and the current sum. –  nhahtdh Aug 8 '12 at 18:09

2 Answers 2

up vote 2 down vote accepted

Look here for a O(n) Python solution. Translating it to functional Ruby is straightforward:

def max_subarray(xs)
  xs.inject([0, 0]) do |(max_so_far, max_up_to_here), x|
    new_max_up_to_here = [max_up_to_here + x, 0].max
    new_max_so_far = [max_so_far, new_max_up_to_here].max
    [new_max_so_far, new_max_up_to_here]
  end.first
end

xs = [31, -41, 59, 26, -53, 58, 97, -93, -23, 84]
max_subarray(xs) #=> 187
share|improve this answer

I got this to a one-liner (not efficient and quite unreadable, though):

(0...arr.length).map{|start| (1..(arr.length-start)).map{|length| arr.slice(start, length).inject(:+)}.max}.max
share|improve this answer
    
Thanks! One liner is awesome! It is really hard to decide but for this case, I am trying to see some design patterns of rewriting DP code into functional flavor. Thanks the same~ –  lkahtz Aug 8 '12 at 20:06

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.