# Representing the strings we use in programming in math notation

Now I'm a programmer who's recently discovered how bad he is when it comes to mathematics and decided to focus a bit on it from that point forward, so I apologize if my question insults your intelligence.

In mathematics, is there the concept of strings that is used in programming? i.e. a permutation of characters.

As an example, say I wanted to translate the following into mathematical notation:

``````let s be a string of n number of characters.
``````

Reason being I would want to use that representation in find other things about string `s`, such as its length: `len(s)`.

How do you formally represent such a thing in mathematics?

Talking more practically, so to speak, let's say I wanted to mathematically explain such a function:

``````fitness(s,n) = 1 / |n - len(s)|
``````

Or written in more "programming-friendly" sort of way:

``````fitness(s,n) = 1 / abs(n - len(s))
``````

I used this function to explain how a fitness function for a given GA works; the question was about finding strings with 5 characters, and I needed the solutions to be sorted in ascending order according to their fitness score, given by the above function.

So my question is, how do you represent the above pseudo-code in mathematical notation?

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Two quick comments. First, if s is a string of n characters, then isn't len(s) by definition n? I am having trouble understanding the denominator, because it seems like n = len(s). Second, I looked at our sister site, Mathematics, and did a query on length with math.stackexchange.com/… . In graph theory (which seems to be related to your question), they just use a letter for length, as in math.stackexchange.com/q/9293/5220. –  rajah9 Apr 22 '11 at 13:41
No, `n` is not `len(s)`. `n` is the target for my 'optimal' solutions and `len(s)` is just the number of characters for the given chromosome. –  Andreas Grech Apr 22 '11 at 13:51
Yes they use `n` but I don't need to represent any length; I wanted to know a way on how to represent a string's length specifically and the notation involved. –  Andreas Grech Apr 23 '11 at 6:24

You can use the notation of language theory, which is used to discuss things like regular languages, context free grammars, compiler theory, etc. A quick overview:

• A set of characters is known as an alphabet. You could write: "Let A be the ASCII alphabet, a set containing the 128 ASCII characters."

• A string is a sequence of characters. ε is the empty string.

• A set of strings is formally known as a language. A common statement is, "Let sL be a string in language L."

• Concatenating alphabets produces sets of strings (languages). A represents all 1-character strings, AA, also written A2, is the set of all two character strings. A0 is the set of all zero-length strings and is precisely A0 = {ε}. (It contains exactly one string, the empty string.)

• A* is special notation and represents the set of all strings over the alphabet A, of any length. That is, A* = A0A1A2A3 ... . You may recognize this notation from regular expressions.

• For length use absolute value bars. The length of a string s is |s|.

let s be a string of n number of characters.

You could write:

Let A be a set of characters and sAn be a string of n characters. The length of s is |s| = n.

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So, if I understand you correctly, when the absolute value bars are used in the context of a string, they represent the length of the string? –  Andreas Grech Apr 22 '11 at 13:59
Yes, that's correct. –  John Kugelman Apr 22 '11 at 14:10
+1 for steering OP toward language theory and lovely notation. –  rajah9 Apr 22 '11 at 15:43
Aha, I think this is answer I was searching for...brilliant stuff for me to research more about. Thanks a lot John and I hope I didn't insult your intelligence or anyone else's `:)` –  Andreas Grech Apr 23 '11 at 6:21
Mathematically, you have explained `fitness(s, n)` just fine as long as `len(s)` is well-defined.
In CS texts, a string s over a set S is defined as a finite ordered list of elements of S and its length is often written as |s| - but this is only notation, and doesn't change the (mathematical) meaning behind your definition of `fitness`, which is pretty clear just how you've written it.