Approximate string matching is not a stranger problem.

I am learning and trying to understand how to solve it. I even now don't want to get too deep into it and just want to understand the brute-force way.

In its wiki page (Approximate string matching), it says

A brute-force approach would be to compute the edit distance to P (the pattern) for all substrings of T, and then choose the substring with the minimum distance. However, this algorithm would have the running time O(m * n^3), n is the length of T, m is the length of P

Ok. I understand this statement in the following way:

- We find out all possible substrings of T
- We compute the edit distance of each pair of strings {P, t1}, {P, t2}, ...
- We find out which substring has the shortest distance from P and this substring is the answer.

I have the following question:

a. I can use two for-loop to get all possible substrings and this requires O(n^2). So when I try to compute the edit distance of one substring and the patter, does it need O(n*m)? Why?

b. How exactly do I compute the distance of one pair (one substring and the patter)? I know I can insert, delete, substitute, but can anyone give me a algorithm that do just the calculation for one pair?

Thanks

## Edit

Ok, I should use Levenshtein distance, but I don't quite understand its method.

Here is part of the code

```
for j from 1 to n
{
for i from 1 to m
{
if s[i] = t[j] then
d[i, j] := d[i-1, j-1] // no operation required
else
d[i, j] := minimum
(
d[i-1, j] + 1, // a deletion
d[i, j-1] + 1, // an insertion
d[i-1, j-1] + 1 // a substitution
)
}
}
```

So, assume I am now comparing `{"suv", "svi"}`

.

So `'v' != 'i'`

, then I have to see three other pairs:

`{"su", "sv"}`

`{"suv", "sv"}`

`{"su", "svi"}`

How can I understand this part? Why I need to see these 3 parts?

Does the `distance between two prefixes`

mean that we need `distance`

number of changes in order to make the two prefixes (or strings) equal?

So, let's take a look at `{"su", "sv"}`

. We can see that distance of `{"su", "sv"}`

is 1. Then how can `{"su", "sv"}`

become `{"suv", "svi"}`

by just adding 1? I think we need to insert 'v' into "su" and 'v' into "sv" and then substitute the last 'i' with 'v', which has 3 operations involved, right?