The Incompressibility Method is said to simplify the analysis of algorithms for the average case. From what I understand, this is because there is no need to compute all of the possible combinations of input for that algorithm and then derive an average complexity. Instead, a single incompressible string is taken as the input. As an incompressible string is typical, we can assume that this input can act as an accurate approximation of the average case.

I am lost in regard to actually applying the Incompressibility Method to an algorithm. As an aside, I am not a mathematician, but think that this theory has practical applications in everyday programming.

Ultimately, I would like to learn how I can deduce the average case of any given algorithm, be it trivial or complex. Could somebody please demonstrate to me how the method can be applied to a simple algorithm? For instance, given an input string *S*, store all of the unique characters in *S*, then print each one individually:

```
void uniqueChars(String s) {
char[] chars = chars[ s.length() ]
int free_idx = 0;
for (int i = 0; i < s.length(); i++) {
if (! s[i] in chars) {
chars[free_idx] = s[i]
free_idx++;
}
}
for (int i = 0; i < chars.length(); i++) {
print (chars[i])
}
}
```

Only for the sake of argument. I think pseudo-code is sufficient. Assume a linear search for checking whether the array contains an element.

Better algorithms by which the theory can be demonstrated are acceptable, of course.

This question maybe nonsensical and impractical, but I would rather ask than hold misconceptions.

`Set.add`

depends on the implementation of`Set`

. – murgatroid99 Jul 7 '14 at 20:47