# Substring with greatest ratio

Let's assume I have some sequence containing `{A,B}` and there is at least one occurrence of each letter in a sequence. How to find substring within sequence that fulfill requirements:

• number of A's to number of B's should be highest possible ratio (#A/#B --> max)
• if there are many substring with same ratio we have to return longest possible substring
• finally if there are many of them with same length, we had to return the one with lower beginning index

As output we want index of beginning of found substring and it's length.

Example

``````IN: AAABAA
OUT: index = 0, length = 6 (ratio is 5 : 1)
IN: BABAABBA
OUT: index = 1, length = 4 (ratio is 3 : 1)
``````

Any hints how to approach problem?

As a request I'm adding my thoughts:

1. If some two groups of consecutive A's are separated with 3 or more B's there's no reason to test it further. It's quite simple because if we had substring like: `...A{k}BBBA{m}...` ratio is `(k+m):3` whereas `k:1` or `m:1` must give better option
2. I tried also finding all longest substrings of A's in sequence. I thought it would be highly propable that my sequence would be something like `A{N1}BA{N2}BA{N3}` but later on I found it not necesearily true for instance:

BABAABBAAA

As we can see there are two sequence with same ratio:

1. i=1 length=4
2. i=6 length=4

But as rule 3rd implies I should return the first one wheres as I said my algorithm was based on longest consecutive A's in sequence.

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tell us what you tried. at least the brute force solution with asymptotic complexity. –  Karoly Horvath Oct 19 '13 at 15:30
@KarolyHorvath I've edited orginal post with what I've tried. –  abc Oct 19 '13 at 15:43

1. What happens if you have only one `B` in the sequence?
2. What happens if there are two `B`'s? Assume your sequence contains `x A`'s, then a single `B`, then `y A`'s, then a single `B` again, and then `z A`'s and write some inequalities.
3. Make the reasoning work for all sequences (hint: for any sequence of numbers `a[1] ... a[n]` `(a[1] + ... + a[n])/n <= max(a[1], ... , a[n]`, and the equality occurs only when all the element are equal).