Maximize the rectangular area under Histogram

Question

I have a histogram with integer heights and constant width 1. I want to maximize the rectangular area under a histogram. e.g.:

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The answer for this would be 6, 3 * 2, using col1 and col2.

O(n^2) brute force is clear to me, I would like an O(n log n) algorithm. I'm trying to think dynamic programming along the lines of maximum increasing subsequence O(n log n) algo, but am not going forward. Should I use divide and conquer algorithm?

PS: People with enough reputation are requested to remove the divide-and-conquer tag if there is no such solution.

After mho's comments: I mean the area of largest rectangle that fits entirely. (Thanks j_random_hacker for clarifying :) ).

Answer 1

You have a lot of solutions here, both O(n log n) and O(n).

Answer 2

Implementation in Python of the @IVlad's answer O(n) solution:

from collections import namedtuple

Info = namedtuple('Info', 'start height')

def max_rectangle_area(histogram):
    """Find the area of the largest rectangle that fits entirely under
    the histogram.

    """
    stack = []
    top = lambda: stack[-1]
    max_area = 0
    pos = 0 # current position in the histogram
    for pos, height in enumerate(histogram):
        start = pos # position where rectangle starts
        while True:
            if not stack or height > top().height:
                stack.append(Info(start, height)) # push
            elif stack and height < top().height:
                max_area = max(max_area, top().height*(pos-top().start))
                start, _ = stack.pop()
                continue
            break # height == top().height goes here

    pos += 1
    for start, height in stack:
        max_area = max(max_area, height*(pos-start))

    return max_area

Example:

>>> f = max_rectangle_area
>>> f([5,3,1])
6
>>> f([1,3,5])
6
>>> f([3,1,5])
5
>>> f([4,8,3,2,0])
9
>>> f([4,8,3,1,1,0])
9

Linear search using a stack of incomplete subproblems

Copy-paste algorithm's description (in case the page goes down):

We process the elements in left-to-right order and maintain a stack of information about started but yet unfinished subhistograms. Whenever a new element arrives it is subjected to the following rules. If the stack is empty we open a new subproblem by pushing the element onto the stack. Otherwise we compare it to the element on top of the stack. If the new one is greater we again push it. If the new one is equal we skip it. In all these cases, we continue with the next new element. If the new one is less, we finish the topmost subproblem by updating the maximum area w.r.t. the element at the top of the stack. Then, we discard the element at the top, and repeat the procedure keeping the current new element. This way, all subproblems are finished until the stack becomes empty, or its top element is less than or equal to the new element, leading to the actions described above. If all elements have been processed, and the stack is not yet empty, we finish the remaining subproblems by updating the maximum area w.r.t. to the elements at the top.

For the update w.r.t. an element, we find the largest rectangle that includes that element. Observe that an update of the maximum area is carried out for all elements except for those skipped. If an element is skipped, however, it has the same largest rectangle as the element on top of the stack at that time that will be updated later. The height of the largest rectangle is, of course, the value of the element. At the time of the update, we know how far the largest rectangle extends to the right of the element, because then, for the first time, a new element with smaller height arrived. The information, how far the largest rectangle extends to the left of the element, is available if we store it on the stack, too.

We therefore revise the procedure described above. If a new element is pushed immediately, either because the stack is empty or it is greater than the top element of the stack, the largest rectangle containing it extends to the left no farther than the current element. If it is pushed after several elements have been popped off the stack, because it is less than these elements, the largest rectangle containing it extends to the left as far as that of the most recently popped element.

Every element is pushed and popped at most once and in every step of the procedure at least one element is pushed or popped. Since the amount of work for the decisions and the update is constant, the complexity of the algorithm is O(n) by amortized analysis.

Answer 3

There are three ways to solve this problem in addition to the brute force approach. I will write down all of them. The java codes have passed tests in an online judge site called leetcode: http://www.leetcode.com/onlinejudge#question_84. so I am confident codes are correct.

Solution 1: dynamic programming + n*n matrix as cache

time: O(n^2), space: O(n^2)

Basic idea: use the n*n matrix dp[i][j] to cache the minimal height between bar[i] and bar[j]. Start filling the matrix from rectangles of width 1.

public int solution1(int[] height) {

    int n = height.length;
    if(n == 0) return 0;
    int[][] dp = new int[n][n];        
    int max = Integer.MIN_VALUE;

    for(int width = 1; width <= n; width++){

        for(int l = 0; l+width-1 < n; l++){

            int r = l + width - 1;

            if(width == 1){
                dp[l][l] = height[l];
                max = Math.max(max, dp[l][l]);
            } else {                    
                dp[l][r] = Math.min(dp[l][r-1], height[r]);
                max = Math.max(max, dp[l][r] * width);
            }                
        }
    }

    return max;
}

Solution 2: dynamic programming + 2 arrays as cache.

time: O(n^2), space: O(n)

Basic idea: this solution is like solution 1, but saves some space. The idea is that in solution 1 we build the matrix from row 1 to row n. But in each iteration, only the previous row contributes to the building of the current row. So we use two arrays as previous row and current row by turns.

public int Solution2(int[] height) {

    int n = height.length;
    if(n == 0) return 0;

    int max = Integer.MIN_VALUE;

    // dp[0] and dp[1] take turns to be the "previous" line.
    int[][] dp = new int[2][n];      

    for(int width = 1; width <= n; width++){

        for(int l = 0; l+width-1 < n; l++){

            if(width == 1){
                dp[width%2][l] = height[l];
            } else {
                dp[width%2][l] = Math.min(dp[1-width%2][l], height[l+width-1]);                     
            }
            max = Math.max(max, dp[width%2][l] * width);   
        }
    }        
    return max;
}

Solution 3: use stack.

time: O(n), space:O(n)

This solution is tricky and I learnt how to do this from explanation without graphs and explanation with graphs. I suggest you read the two links before reading my explanation below. It's hard to explain without graphs so my explanations might be hard to follow.

Following are my explanations:

1. For each bar, we must be able to find the biggest rectangle containing this bar. So the biggest one of these n rectangles is what we want.

2. To get the biggest rectangle for a certain bar (let's say bar[i], the (i+1)th bar), we just need to find out the biggest interval that contains this bar. What we know is that all the bars in this interval must be at least the same height with bar[i]. So if we figure out how many consecutive same-height-or-higher bars are there on the immediate left of bar[i], and how many consecutive same-height-or-higher bars are there on the immediate right of the bar[i], we will know the length of the interval, which is the width of the biggest rectangle for bar[i].

3. To count the number of consecutive same-height-or-higher bars on the immediate left of bar[i], we only need to find the closest bar on the left that is shorter than the bar[i], because all the bars between this bar and bar[i] will be consecutive same-height-or-higher bars.

4. We use a stack to dynamicly keep track of all the left bars that are shorter than a certain bar. In other words, if we iterate from the first bar to bar[i], when we just arrive at the bar[i] and haven't updated the stack, the stack should store all the bars that are no higher than bar[i-1], including bar[i-1] itself. We compare bar[i]'s height with every bar in the stack until we find one that is shorter than bar[i], which is the cloest shorter bar. If the bar[i] is higher than all the bars in the stack, it means all bars on the left of bar[i] are higher than bar[i].

5. We can do the same thing on the right side of the i-th bar. Then we know for bar[i] how many bars are there in the interval.

   public int solution3(int[] height) {
   
       int n = height.length;
       if(n == 0) return 0;
   
       Stack<Integer> left = new Stack<Integer>();
       Stack<Integer> right = new Stack<Integer>();
   
       int[] width = new int[n];// widths of intervals.
       Arrays.fill(width, 1);// all intervals should at least be 1 unit wide.
   
       for(int i = 0; i < n; i++){
           // count # of consecutive higher bars on the left of the (i+1)th bar
           while(!left.isEmpty() && height[i] <= height[left.peek()]){
               // while there are bars stored in the stack, we check the bar on the top of the stack.
               left.pop();                
           }
   
           if(left.isEmpty()){
               // all elements on the left are larger than height[i].
               width[i] += i;
           } else {
               // bar[left.peek()] is the closest shorter bar.
               width[i] += i - left.peek() - 1;
           }
           left.push(i);
       }
   
       for (int i = n-1; i >=0; i--) {
   
           while(!right.isEmpty() && height[i] <= height[right.peek()]){                
               right.pop();                
           }
   
           if(right.isEmpty()){
               // all elements to the right are larger than height[i]
               width[i] += n - 1 - i;
           } else {
               width[i] += right.peek() - i - 1;
           }
           right.push(i);
       }
   
       int max = Integer.MIN_VALUE;
       for(int i = 0; i < n; i++){
           // find the maximum value of all rectangle areas.
           max = Math.max(max, width[i] * height[i]);
       }
   
       return max;
   }
   

Answer 4

I felt this one is the best still now! (My solution is using transition of subScript & superScript methodology by which u need not to backtrack for finding the start or the end ).

Please check my solution: http://programminginterviewssolutions.blogspot.in/2012/11/maximum-area-of-rectangle-in-histogram.html.

Please download PDF of my Explanation: http://www.scribd.com/doc/112600829/Rectangle-of-Max-AREA-in-Histogram.

Enjoy.....and kindly vote for it!

T(n) < O(2n) ~ O(n)

S(n) < O(n)

Answer 5

I don't understand the other entries, but I think I know how to do it in O(n) as follows.

A) for each index find the largest rectangle inside the histogram ending at that index where the index column touches the top of the rectangle and remember where the rectangle starts. This can be done in O(n) using a stack based algorithm.

B) Similarly for each index find the largest rectangle starting at that index where the index column touches the top of the rectangle and remember where the rectangle ends. Also O(n) using the same method as (A) but scanning the histogram backwards.

C) For each index combine the results of (A) and (B) to determine the largest rectangle where the column at that index touches the top of the rectangle. O(n) like (A).

D) Since the largest rectangle must be touched by some column of the histogram the largest rectangle is the largest rectangle found in step (C).

The hard part is implementing (A) and (B), which I think is what JF Sebastian may have solved rather than the general problem stated.