# Subarray which consists of numbers that can be arranged in a continuous sequence. [closed]

Find the subarray of length W which consists of numbers that can be arranged in a continuous sequence. For ex- {4,5,1,5,7,6,8,4,1} and W is 5, output can be -{5,7,6,8,4}..

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## closed as not a real question by amit, Konrad Rudolph, Paul R, ybungalobill, tchristSep 3 '12 at 2:10

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Is it homework? If so - please tag it appropriately. What did you try? –  amit Sep 2 '12 at 8:36
Do you have a limit on the number of numbers in the array? And how do you define continuous sequence? Arithmetic progression with step = 1? –  nhahtdh Sep 2 '12 at 8:40
I tried the following approach. For every subarray of length W, I will obtain the sum of that subarray. and will subtract W * min(subarray) which must be equal to sum of first W-1 natural numbers. –  Bhanu Kishore Sep 2 '12 at 8:44
Yes, the numbers difference should be 1. –  Bhanu Kishore Sep 2 '12 at 8:44
I've removed my answer because OP is too similar to the question from a running contest codechef.com/SEP12/problems/CHEFTOWN. –  Evgeny Kluev Sep 2 '12 at 14:56

A contiguous subarray of length W, containing a continuous (but unsorted) sequence, has three properties that can be used to construct an efficient algorithm:

1. There are W elements in the subarray.
2. Difference between max and min numbers in the subarray is `W-1`.
3. There are no duplicate elements in the subarray.

Algorithm should advance two pointers to input array and check if the subarray between these pointers satisfies these three properties.

1. Advance both pointers to keep difference between pointers equal to W.
2. While advancing the first pointer, put corresponding array element to a set (to control duplicates) and to a min-max queue (to control range of numbers).
3. If a duplicate is found in the set, advance second pointer to position of first of these duplicate elements, updating both the set and the queue.
4. Advance second pointer while difference between max and min values keeps greater than `W-1`, remove corresponding elements from both the set and the queue.
5. Stop when all three properties are true.

A min-max queue may be implemented as a pair of min-max stacks, described in this answer. A set may be implemented either as a hash set (giving O(n) expected complexity for the algorithm), or as a binary search tree (giving O(n log(n)) worst case complexity), or as a combination of a bitset and a ringbuffer - to keep only bits, corresponding to elements that are between min and max values, reported by queue (giving O(n) worst case complexity).

Example for input array {42,10,7,4,5,1,5,7,6,8,4,1} and W=5 (":" marks start of the ringbuffer).

``````subarray       bitset        rb_start     min  max
42             :1 0 0 0 0    42           42   42
10             :1 0 0 0 0    10           10   10 (with 42, max-min>W-1)
10 7            1 0:1 0 0    7            7    10
7 4             0 0 1 0:1    4            4    7  (with 10, max-min>W-1)
7 4 5           1 0 1 0:1    4            4    7
4 5 1           1:1 0 0 1    1            1    5  (with 7, max-min>W-1)
1 5             1:1 0 0 0    1            1    5  (5 is a duplicate)
5 7            :1 0 1 0 0    5            5    7  (with 1, max-min>W-1)
5 7 6          :1 1 1 0 0    5            5    7
5 7 6 8        :1 1 1 1 0    5            5    8
5 7 6 8 4       1 1 1 1:1    4            4    8  (success)
``````
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This is the question from a running contest codechef.com/SEP12/problems/CHEFTOWN . Please remove your post. Its a humble request –  Wayne Rooney Sep 2 '12 at 14:32
Contest is over. In fact, contest question is a little bit simpler because it guarantees no duplicates and limits range of array elements. –  Evgeny Kluev Sep 11 '12 at 10:14