# Find the longest substring with contiguous characters, where the string may be jumbled

Given a string, find the longest substring whose characters are contiguous (i.e. they are consecutive letters) but possibly jumbled (i.e. out of order). For example:
Input : `"owadcbjkl"`
Output: `"adcb"`
We consider `adcb` as contiguous as it forms `abcd`.

(This is an interview question.)

I have an idea of running a while loop with 2 conditions, one that checks for continuous characters using Python's `ord` and another condition to find the minimum and maximum and check if all the following characters fall in this range.

Is there any way this problem could be solved with low running time complexity? The best I can achieve is O(N^2) where N is the length of the input string and `ord()` seems to be a slow operation.

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The question is too verbose: try to write your algorithm in a Python-like format (pseudo-code) so that we can understand it better. –  Don Mar 25 '13 at 13:23
This kind of question is off-topic here. You should ask this over at codereview.stackexchange.com –  Ocaso Protal Mar 25 '13 at 13:25
Please provide a detailed explanation of what defines a valid substring in your question. You've said that `adcb` is valid, would `adc` be too? –  MattH Mar 25 '13 at 13:28
The simple `O(n*m*m)` solution can based on the fact that the longest substring is no longer than `m` where `m` is the alphabet size. If `m` is fixed e.g., `m == 26` then it is a linear time (though ineffective) solution. If `m` is not fixed then this question might be related. –  J.F. Sebastian Mar 25 '13 at 14:18
@OcasoProtal This question is fully on-topic on Stack Overflow since it is about implementing a software algorithm. It would be off-topic on Code Review which is only about reviewing working code; I'm puzzled why you would even suggest it. A question about the algorithm itself would be on-topic on Computer Science, but not implementing it in Python: this firmly belongs on Stack Overflow. –  Gilles Mar 25 '13 at 14:51

If the substring is defined as `''.join(sorted(substr)) in alphabet` then:

• there is no duplicates in the substring and therefore the size of the longest substring is less than (or equal to) the size of the alphabet

• `(ord(max(substr)) - ord(min(substr)) + 1) == len(substr)`, where `ord()` returns position in the alphabet (+/- constant) (builtin `ord()` can be used for lowercase ascii letters)

Here's `O(n*m*m)`-time, `O(m)`-space solution, where `n` is `len(input_string)` and `m` is `len(alphabet)`:

``````from itertools import count

def longest_substr(input_string):
maxsubstr = input_string[0:0] # empty slice (to accept subclasses of str)
for start in range(len(input_string)): # O(n)
for end in count(start + len(maxsubstr) + 1): # O(m)
substr = input_string[start:end] # O(m)
if len(set(substr)) != (end - start): # found duplicates or EOS
break
if (ord(max(substr)) - ord(min(substr)) + 1) == len(substr):
maxsubstr = substr
return maxsubstr
``````

Example:

``````print(longest_substr("owadcbjkl"))
@Sandy: slicing a string returns a copy in CPython. To copy `m` characters you need O(m)-time, and O(m)-space. `buffer()` or `memoryview()` could used to avoid copying but `set`, `max`, `min` are O(m) time so it won't improve the time complexity. –  J.F. Sebastian Mar 26 '13 at 14:44
@Sandy: You could probably get `O(n*m)` if you keep `min[startpos]` that store a minimum starting at `startpos` till current position and use it to reset the start position for current substr when a duplicate is detected (you could use a `seen` list of size `len(alphabet)` to keep position where duplicate is located). I haven't thought it through. For a fixed `m` (`len(alphabet)`) it just improves the constant factor and doesn't change the time complexity. I'm not sure that sublinear time performance with respect to `n` (`len(input_string)`) is possible. –  J.F. Sebastian Mar 26 '13 at 14:44