We want to search for a given element in a circular sorted array in complexity not greater than O(log n)
.
Example: Search for 13
in {5,9,13,1,3}
.
My idea was to convert the circular array into a regular sorted array then do a binary search on the resulting array, but my problem was the algorithm I came up was stupid that it takes O(n)
in the worst case:
for(i = 1; i < a.length; i++){
if (a[i] < a[i-1]){
minIndex = i; break;
}
}
then the corresponding index of ith element will be determined from the following relation:
(i + minInex - 1) % a.length
it is clear that my conversion (from circular to regular) algorithm may take O(n), so we need a better one.
According to ire_and_curses idea, here is the solution in Java:
public int circularArraySearch(int[] a, int low, int high, int x){
//instead of using the division op. (which surprisingly fails on big numbers)
//we will use the unsigned right shift to get the average
int mid = (low + high) >>> 1;
if(a[mid] == x){
return mid;
}
//a variable to indicate which half is sorted
//1 for left, 2 for right
int sortedHalf = 0;
if(a[low] <= a[mid]){
//the left half is sorted
sortedHalf = 1;
if(x <= a[mid] && x >= a[low]){
//the element is in this half
return binarySearch(a, low, mid, x);
}
}
if(a[mid] <= a[high]){
//the right half is sorted
sortedHalf = 2;
if(x >= a[mid] && x<= a[high] ){
return binarySearch(a, mid, high, x);
}
}
// repeat the process on the unsorted half
if(sortedHalf == 1){
//left is sorted, repeat the process on the right one
return circularArraySearch(a, mid, high, x);
}else{
//right is sorted, repeat the process on the left
return circularArraySearch(a, low, mid, x);
}
}
Hopefully this will work.
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