It seems to be a searching algorithm based off of Mergesort. It is to be used on a sorted array of numbers. Is the Big-O complexity still O(n log n)?

```
public static boolean fastSearch(int[] data, int min, int max, int target)
{
int N = data.length;
boolean found = false;
int midpoint = (min+max)/2; // determine the midpoint
if (data[midpoint] == target) {
found = true;
} else {
if (data[midpoint] > target) {
if (min <= midpoint - 1) {
// Recursion on the left half of the array
found = fastSearch(data, min, midpoint-1, target);
}
} else {
if (midpoint + 1 <= max) {
// Recursion on the right half of the array
found = fastSearch(data, midpoint+1, max, target);
}
}
}
return found;
}
```

This is my own analysis I did, I just want to confirm if I'm correct or not:

Each pass through the data doubles the size of the subsections. These need to be repeatedly doubled until it finds the target. It takes log(n) doublings, and each pass of the data is proportional to the number of items. So, it is O(n log n).

`O(log n)`

. That being said, I can't say that this is a proper implementation based on your formatting. – C.B. Nov 26 '13 at 19:13