I have been learning a Levenshtein distance today, and have stummbled upon what it seems to be a strange way of calculation in a well-known Wagner-Fisher algorithm. Please help me find where I've got it wrong.

First string is `Max`

.

Second is `Annas`

.

A matrix of transformation would be the following:

An algorithm reports that the Levenshtein distance from Max to Annas is 4.

So here is how I understand it should work: (given that the cost of any action is 1)

`M`

vs `A`

-> Replace `m`

with `a`

(**1** action so far)

`A`

vs `N`

-> Replace `a`

with `n`

(**2** actions so far)

`X`

vs `N`

-> Replace `x`

with `n`

(**3** actions so far)

After this, we just need to be adding the letters that are left a and s, which take **2** more action from us, resulting in **5** total, not 4.

I see that it is going along a simpler path probably, but what is it? Please explain it's algorithms logic of operation.

Thanks.