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 am having a Algorithm question, in which numbers are been given from 1 to N and a number of operations are to be performed and then min/max has to be found among them.

Two operations - Addition and subtraction

and operations are in the form a b c d , where a is the operation to be performed,b is the starting number and c is the ending number and d is the number to be added/subtracted

for example

suppose numbers are 1 to N and N =5

1 2 3 4 5

We perform operations as

1 2 4 5

2 1 3 4

1 4 5 6

By these operations we will have numbers from 1 to N as

1 7 8 9 5

-3 3 4 9 5

-3 3 4 15 11

So the maximum is 15 and min is -3

My Approach: I have taken the lower limit and upper limit of the numbers in this case it is 1 and 5 only stored in an array and applied the operations, and then had found the minimum and maximum.

Could there be any better approach?

share|improve this question
What language are you writing in? –  Chris Dargis Aug 6 '12 at 16:27
In both C and C++ –  Luv Aug 6 '12 at 16:28
@DougRamsey: I think it is not important here. Probably language-agnostic tag should be used. –  nhahtdh Aug 6 '12 at 16:28
@Luv: Do you have any information about the range of input? –  nhahtdh Aug 6 '12 at 16:28
@nhahtdh Yes The range of values are from 1 to 1000000 –  Luv Aug 6 '12 at 16:37

2 Answers 2

up vote 2 down vote accepted

I will assume that all update (addition/subtraction) operations happen before finding max/min. I don't have a good solution for update and min/max operations mixing together.

You can use a plain array, where the value at index i of the array is the difference between the index i and index (i - 1) of the original array. This makes the sum from index 0 to index i of our array to be the value at index i of the original array.

Subtraction is addition with the negated number, so they can be treated similarly. When we need to add k to the original array from index i to index j, we will add k to index i of our array, and subtract k to index (j + 1) of our array. This takes O(1) time per update.

You can find the min/max of the original array by accumulating summing the values and record the max/min values. This takes O(n) time per operation. I assume this is done once for the whole array.


a[N] // Original array
d[N] // Difference array

// Initialization
d[0] = a[0]
for (i = 1 to N-1)
    d[i] = a[i] - a[i - 1]

// Addition (subtraction is similar)
add(from_idx, to_idx, amount) {
    d[from_idx] += amount
    d[to_idx + 1] -= amount

// Find max/min for the WHOLE array after add/subtract
current = max = min = d[0];
for (i = 1 to N - 1) {
   current += d[i]; // Sum from d[0] to d[i] is a[i]
   max = MAX(max, current);
   min = MIN(min, current);
share|improve this answer
Thanks a Lot for such a nice solution –  Luv Aug 7 '12 at 7:48

Generally there is no "best way" to find the min/max in the performance point of view because it depends on how this application will be used.

-Finding the max and min in a list needs O(n) Time, so if you want to run many (many in the context of the input) operations, your approach to find the min/max after all the operations took place is fine.

-But if the list will hold many elements and you don’t want to run that many operations, you better check each result of the op if its a new max/min and update if necessary.

share|improve this answer
If the list is static (which is not the case here), max/min can be found in O(log n) with the right data structure. –  nhahtdh Aug 6 '12 at 16:52
you are right, thx –  Quick n Dirty Aug 6 '12 at 16:54
Your answer is missing here and there. O(log n) time for finding max/min is possible with segment tree, but update operation will take O(n) in worst case. I can think of another solution using plain array with O(1) update operation, but worst case O(n) time for finding max/min. –  nhahtdh Aug 6 '12 at 16:59
There are many ways of finding min/max in O(log n) Time (FastSearch, Bin.Search, Quadratic Bin. Search). But why would updating ever need O(n) time in worst case? For 1 Operation it would allways need constant Time. –  Quick n Dirty Aug 6 '12 at 17:05
Bin Search needs the array to be sorted. After addition/subtraction, the array is no longer sorted. –  nhahtdh Aug 6 '12 at 17:05

Your Answer


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.