# I need a proof for a function postcondition

this is a homework but I just cannot get my head around this whole business with writing formal prooves. Could anyone crack this and write formal proof for postcondition of this fnc:

string REPLACE_BY (string s,char c,char d)

postcondition The returned value is the string formed from s by replacing every occurrence of c by d (and otherwise leaving s unchanged).

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maybe.. this belongs on cstheory.stackexchange.com? not sure? – gideon Mar 19 '11 at 10:13
@giddy: Nope. Cstheory is for research-level questions only. – sepp2k Mar 19 '11 at 10:43
@sepp2k ah I see :) Sorry! – gideon Mar 19 '11 at 10:45
Shouldn't every professional programmer be able to do such things? Isn't that part of a being programmer? – There is nothing we can do Mar 19 '11 at 10:45
I know you're having trouble wrapping your head around this prove business and all, but as a general rule when trying to prove that a function meets a given post-condition, you start by looking at the function's definition... which you did not include in the question. – sepp2k Mar 19 '11 at 10:48

In order to proove the correctness of the function (i.e. compliance to a post-condition if the input conforms to a given pre-condition), you need the function's implementation.

I will get you started by giving you the assumptions under which you will need to work, but leave the proof up to you since it's homework.

The assumptions are:

1. that the method is defined as such:

``````String replace_by(String s, char c, char d) {
for (int i = 0; i < s.size();++i) {
if (s[i] == c) {
s[i] = d;
}
}
return s;
}
``````
2. that the precondition is `s != null /\ s.size() < Integer.MAX_VALUE`

3. `old(s)` is used to refer to the value of `s` before entering the function

4. that the formal specification of your postcondition given in prose is

``````old(s) != null /\ s != null /\
\-/i in 0..(old(s).size()-1): (
((old(s)[i] == old(c)) && (s[i] == old(d)))
\/ ((old(s)[i] != old(c)) && (s[i] == old(s)[i]))
)
/\ old(s).size() == s.size()
``````

(`\-/` is the logical for-all operator, `\/` is 'or' and `/\` is 'and')

With this, you should be able to build a proof based on Hoare logic.

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