# How to rewrite finding max contiguous subarray in Dynamic Programming using functional programming paradigm in ruby?

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
``````
-
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

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
``````
-

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
``````
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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