# Longest Consecutive Sequence in an Unsorted Array [duplicate]

You are given an Array of numbers and they are unsorted/random order. You are supposed to find the longest sequence of consecutive numbers in the array. Note the sequence need not be in sorted order within the array. Here is an example :

Input :

``````A[] = {10,21,45,22,7,2,67,19,13,45,12,11,18,16,17,100,201,20,101}
``````

Output is :

``````{16,17,18,19,20,21,22}
``````

The solution needs to be of O(n) complexity.

I am told that the solution involves using a hash table and I did come across few implementations that used 2 hash tables. One cannot sort and solve this because sorting would take O(nlgn) which is not what is desired.

-
Is this homework? –  Dietrich Epp Sep 17 '11 at 7:34
"longest consecutive sequence of numbers" - that would be the whole list. –  Thorbjørn Ravn Andersen Sep 17 '11 at 7:35
@dietrich - No this is not a homework –  Anoop Menon Sep 17 '11 at 7:38
@Thorbj0m - How is that possible ? The whole iist isn't entirely made up on consecutive numbers placed in an unsorted/random manner right ? –  Anoop Menon Sep 17 '11 at 7:38
Radix sort only needs the elements to be of constant size to get O(n), and they are. –  harold Sep 17 '11 at 10:33

## marked as duplicate by templatetypedef, kojiro, Servy, p.s.w.g, Zero PiraeusJul 18 '13 at 6:32

Here is a solution in Python that uses just a single hash set and doesn't do any fancy interval merging.

``````def destruct_directed_run(num_set, start, direction):
while start in num_set:
num_set.remove(start)
start += direction
return start

def destruct_single_run(num_set):
arbitrary_member = iter(num_set).next()
bottom = destruct_directed_run(num_set, arbitrary_member, -1)
top = destruct_directed_run(num_set, arbitrary_member + 1, 1)
return range(bottom + 1, top)

def max_run(data_set):
nums = set(data_set)
best_run = []
while nums:
cur_run = destruct_single_run(nums)
if len(cur_run) > len(best_run):
best_run = cur_run
return best_run

def test_max_run(data_set, expected):
actual = max_run(data_set)
print data_set, actual, expected, 'Pass' if expected == actual else 'Fail'

print test_max_run([10,21,45,22,7,2,67,19,13,45,12,11,18,16,17,100,201,20,101], range(16, 23))
print test_max_run([1,2,3], range(1, 4))
print max_run([1,3,5]), 'any singleton output fine'
``````
-
I am having a little trouble understanding the python code and the range() argument you opted to pass. –  Anoop Menon Sep 17 '11 at 10:19
@AnoopMenon test_max_run is a unit-test and the range is the expected range that max_run should return for the data_set. –  HGF Aug 11 '13 at 1:03

Here's python code based by answer by Grigor Gevorgyan for similar question, I think it's very elegant solution of that problem

``````l = [10,21,45,22,7,2,67,19,13,45,12,11,18,16,17,100,201,20,101]
d = {x:None for x in l}
print d
for (k, v) in d.iteritems():
if v is not None: continue
a, b = d.get(k - 1), d.get(k + 1)
if a is not None and b is not None: d[k], d[a], d[b] = k, b, a
elif a is not None: d[a], d[k] = k, a
elif b is not None: d[b], d[k] = k, b
else: d[k] = k
print d

m = max(d, key=lambda x: d[x] - x)
print m, d[m]
``````

output:

``````{2: 2, 67: None, 100: None, 101: None, 7: None, 201: None, 10: None, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: None, 101: None, 7: None, 201: None, 10: None, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 100, 101: None, 7: None, 201: None, 10: None, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: None, 201: None, 10: None, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: None, 10: None, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: None, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 10, 11: None, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 11, 11: 10, 12: None, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 12, 11: 10, 12: 10, 45: None, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 12, 11: 10, 12: 10, 45: 45, 13: None, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: None, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 16, 17: None, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 17, 17: 16, 18: None, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 18, 17: 16, 18: 16, 19: None, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 19, 17: 16, 18: 16, 19: 16, 20: None, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 20, 17: 16, 18: 16, 19: 16, 20: 16, 21: None, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 21, 17: 16, 18: 16, 19: 16, 20: 16, 21: 16, 22: None}
{2: 2, 67: 67, 100: 101, 101: 100, 7: 7, 201: 201, 10: 13, 11: 10, 12: 10, 45: 45, 13: 10, 16: 22, 17: 16, 18: 16, 19: 16, 20: 16, 21: 16, 22: 16}
16 22
``````
-

This is the solution of Grigor Gevorgyan from a duplicate of this question, but I think simplified:

``````data = [1,3,5,7,4,6,10,3]

# other_sides[x] == other end of interval starting at x
# unknown values for any point not the end of an interval
other_sides = {}
# set eliminates duplicates, and is assumed to be an O(n) operation
for element in set(data):
# my intervals left hand side will be the left hand side
# of an interval ending just before this element
try:
left = other_sides[element - 1]
except KeyError:
left = element

# my intervals right hand side will be the right hand side
# of the interval starting just after me
try:
right = other_sides[element + 1]
except KeyError:
right = element

# satisfy the invariants
other_sides[left] = right
other_sides[right] = left

# convert the dictionary to start, stop segments
# each segment is recorded twice, so only keep half of them
segments = [(start, stop) for start, stop in other_sides.items() if start <= stop]
# find the longest one
print max(segments, key = lambda segment: segment[1] - segment[0])
``````
-
``````class Solution {
public:
struct Node{
int lower;
int higher;
Node(int l, int h):lower(l),higher(h){

}
};
int longestConsecutive(vector<int> &num) {
// Start typing your C/C++ solution below
// DO NOT write int main() function

map<int,Node> interval_map;
map<int,Node>::iterator curr_iter,inc_iter,des_iter;

//first collect
int curr = 0;
int max = -1;
for(size_t i = 0; i < num.size(); i++){
curr = num[i];
curr_iter = interval_map.find(curr);
if (curr_iter == interval_map.end()){
interval_map.insert(make_pair(curr,Node(curr,curr)));
}
}
//the next collect
for(curr_iter = interval_map.begin(); curr_iter != interval_map.end(); curr_iter++)
{
int lower = curr_iter->second.lower;
int higher = curr_iter->second.higher;
int newlower = lower, newhigher = higher;

des_iter = interval_map.find(lower - 1);
if (des_iter != interval_map.end())
{
curr_iter->second.lower = des_iter->second.lower;
newlower = des_iter->second.lower;
}

inc_iter = interval_map.find(higher + 1);
if (inc_iter != interval_map.end()){
curr_iter->second.higher = inc_iter->second.higher;
newhigher = inc_iter->second.higher;
}

if (des_iter != interval_map.end()){
des_iter->second.higher = newhigher;
}
if (inc_iter != interval_map.end()){
inc_iter->second.lower = newlower;
}
if (curr_iter->second.higher - curr_iter->second.lower + 1> max){
max = curr_iter->second.higher - curr_iter->second.lower + 1;
}
}
return max;
}
};
``````
-
Thanks for posting an answer! While a code snippet could answer the question it's still great to add some addition information around, like explain, etc .. –  j0k Feb 26 '13 at 16:19

Another solution is with hash search which runs in O(n)

``````int maxCount = 0;
for (i = 0; i<N; i++)
{
// Search whether a[i] - 1 is present in the list.If it is present,
// you don't need to initiate count since it  will be counted when
// (a[i] - 1) is traversed.
if (hash_search(a[i]-1))
continue;

// Now keep checking if a[i]++ is present in the list, increment the count
num = a[i];
while (hash_search(++num))
count++;

// Now check if this count is greater than the max_count got previously
// and update if it is
if (count > maxCount)
{
maxIndex = i;
count = maxCount;
}
}
``````
-

You could have two tables:

• Start table: (start-point, length)
• End table: (ending-point, length)

When adding a new item, you would check:

• Does value + 1 exist in start table? If so, delete it and create a new entry of (value, length + 1) where length is the "current" length. You'd also update the end table with the same end point but greater length.
• Does value - 1 exist in the end table? If so, delete it and create a new entry of (value, length + 1), and this time update the start table (the starting position will be the same, but the length will be increased)

If both conditions hold, then you're effectively stitching two existing sequences together - replace the four existing entries with two new entries, representing the single longer sequence.

If neither condition holds, you just create a new entry of length 1 in both tables.

After all the values have been added, you can just iterate over the start table to find the key with the largest value.

I think this would work, and would be O(n) if we assume O(1) hash lookup/add/delete.

EDIT: C# implementation. It took a little while to get right, but I think it works :)

``````using System;
using System.Collections.Generic;

class Test
{
static void Main(string[] args)
{
int[] input = {10,21,45,22,7,2,67,19,13,45,12,
11,18,16,17,100,201,20,101};

Dictionary<int, int> starts = new Dictionary<int, int>();
Dictionary<int, int> ends = new Dictionary<int, int>();

foreach (var value in input)
{
int startLength;
int endLength;
bool extendsStart = starts.TryGetValue(value + 1,
out startLength);
bool extendsEnd = ends.TryGetValue(value - 1,
out endLength);

// Stitch together two sequences
if (extendsStart && extendsEnd)
{
ends.Remove(value + 1);
starts.Remove(value - 1);
int start = value - endLength;
int newLength = startLength + endLength + 1;
starts[start] = newLength;
ends[start + newLength - 1] = newLength;
}
// Value just comes before an existing sequence
else if (extendsStart)
{
int newLength = startLength + 1;
starts[value] = newLength;
ends[value + newLength - 1] = newLength;
starts.Remove(value + 1);
}
else if (extendsEnd)
{
int newLength = endLength + 1;
starts[value - newLength + 1] = newLength;
ends[value] = newLength;
ends.Remove(value - 1);
}
else
{
starts[value] = 1;
ends[value] = 1;
}
}

// Just for diagnostics - could actually pick the longest
// in O(n)
foreach (var sequence in starts)
{
Console.WriteLine("Start: {0}; Length: {1}",
sequence.Key, sequence.Value);
}
}
}
``````

EDIT: Here's the single-hashset answer implemented in C# too - I agree, it's simpler than the above, but I'm leaving my original answer for posterity:

``````using System;
using System.Collections.Generic;
using System.Linq;

class Test
{
static void Main(string[] args)
{
int[] input = {10,21,45,22,7,2,67,19,13,45,12,
11,18,16,17,100,201,20,101};

HashSet<int> values = new HashSet<int>(input);

int bestLength = 0;
int bestStart = 0;
// Can't use foreach as we're modifying it in-place
while (values.Count > 0)
{
int value = values.First();
values.Remove(value);
int start = value;
while (values.Remove(start - 1))
{
start--;
}
int end = value;
while (values.Remove(end + 1))
{
end++;
}

int length = end - start + 1;
if (length > bestLength)
{
bestLength = length;
bestStart = start;
}
}
Console.WriteLine("Best sequence starts at {0}; length {1}",
bestStart, bestLength);
}
}
``````
-
Thanks @Jon ! However I have a doubt that if we desire O(1) complexity for our hash lookups wouldn't that mean that our hash buckets will consume memory ? Let's say we have a million numbers in the array and we need to perform this algorithm over it. –  Anoop Menon Sep 17 '11 at 7:50
@Anoop: It would probably still be amortized O(1), but it would indeed take quite a lot of memory. I confess the details of hash table implementations are somewhat beyond me, but so long as there aren't hash collisions I believe it should be okay. I could be mistaken, of course. I doubt that you'll find any solutions based on hash tables which don't rely on O(1) hash operations. –  Jon Skeet Sep 17 '11 at 7:55
Wouldn't this algorithm output {start 16, length 3} for the array given in the question? ...which is how I actually understood the question, too. But it seems there are elements allowed within the consecutive list that are not part of the consecutive list. –  DaveFar Sep 17 '11 at 8:00
@DaveBall: Why would it not spot that 20 is present in the longest sequence? Before reaching 20 it would have { start=16, length=4 } and { end = 19, length = 4 }, as well as { start = 21, length = 2 } and { end = 22, length = 2 }. It would then notice that 20 stitched together those sequences. –  Jon Skeet Sep 17 '11 at 8:06
I posted my solution with working code in an answer. –  rrenaud Sep 17 '11 at 8:51

Here is the implementation:

``````static int[] F(int[] A)
{
Dictionary<int, int> low = new Dictionary<int, int>();
Dictionary<int, int> high = new Dictionary<int, int>();

foreach (int a in A)
{
int lowLength, highLength;

bool lowIn = low.TryGetValue(a + 1, out lowLength);
bool highIn = high.TryGetValue(a - 1, out highLength);

if (lowIn)
{
if (highIn)
{
low.Remove(a + 1);
high.Remove(a - 1);
low[a - highLength] = high[a + lowLength] = lowLength + highLength + 1;
}
else
{
low.Remove(a + 1);
low[a] = high[a + lowLength] = lowLength + 1;
}
}
else
{
if (highIn)
{
high.Remove(a - 1);
high[a] = low[a - highLength] = highLength + 1;
}
else
{
high[a] = low[a] = 1;
}
}
}

int maxLow = 0, maxLength = 0;
foreach (var pair in low)
{
if (pair.Value > maxLength)
{
maxLength = pair.Value;
maxLow = pair.Key;
}
}

int[] ret = new int[maxLength];
for (int i = 0; i < maxLength; i++)
{
ret[i] = maxLow + i;
}

return ret;
}
``````
-
Thanks ! Good one, but the solution with a single hash bucket is relatively better :) Check out Jon's and rrenaud's solutions. Thanks once again Peter –  Anoop Menon Sep 17 '11 at 10:07

Dump everything to a hash set.

Now go through the hashset. For each element, look up the set for all values neighboring the current value. Keep track of the largest sequence you can find, while removing the elements found from the set. Save the count for comparison.

Repeat this until the hashset is empty.

Assuming lookup, insertion and deletion are O(1) time, this algorithm would be O(N) time.

Pseudo code:

`````` int start, end, max
int temp_start, temp_end, count

hashset numbers

for element in array:

while !numbers.empty():
number = numbers[0]
count = 1
temp_start, temp_end = number

while numbers.contains(number - 1):
temp_start = number - 1; count++
numbers.remove(number - 1)

while numbers.contains(number + 1):
temp_end = number + 1; count++
numbers.remove(number + 1)

if max < count:
max = count
start = temp_start; end = temp_end

max_range = range(start, end)
``````

The nested whiles don't look pretty, but each number should be used only once so should be O(N).

-
Pretty neat except for one part which I am missing out. How will I find the starting of the sequence if I keep deleting the 'n-1' element in the sequence because I found 'n' in the hash already ? –  Anoop Menon Sep 17 '11 at 7:57
@Anoop I added pseudo code, hopefully it's more clear now –  Henry Z Sep 17 '11 at 8:05
The first addition to the hash is O(n). Now for each number in the hash you are iterating 'x' times in the decremental direction and 'y' times to the incremental direction. The while within a while is almost unavoidable in your solution making it > O(n) right ? albeit by a constant k where k is proportional to the number of consecutive elements present in the original set. However Jon's solution 'k' seems to be throttled by the fact that both 'start' and 'end' table operations evaluate to true. –  Anoop Menon Sep 17 '11 at 8:25
You need to update number inside the erase loops. –  rrenaud Sep 17 '11 at 8:32
@renaud - count++ is done inside the loops if that is what you are referring to –  Anoop Menon Sep 17 '11 at 10:08