# searching a element in a array which is rotated N times

I have a sorted array which is rotated n times, n is unknown.Now I want to search an element using binary search in O(nlog n).I implemented the following code, it works fine. But I think condition if((end-start)==1 ) can be skipped by making some modifications, can any one suggest?

``````Eg of array 1 2 3 4 5
2 3 4 5 1 //rotated once
``````

Code:

``````public static int srch(int a[],int start,int end,int key){
if(start>end)
return -1;

if((end-start)==1 ){
if(key==a[start])
return start;
else if(key==a[end])
return end;
else
return -1;
}
int mid = (start+end)/2;

if(a[mid]== key){
return mid;
}
else{
if(a[start] < a[mid] ){
//first half is sorted
if(key>a[mid]|| key <a[start]){
start= mid+1;
}else{
end =mid-1;
}
}else{
//second half is sorted

if(key>a[mid]){
start= mid+1;
}else{
end =mid-1;
}
}
return srch(a, start, end, key);
}
}
``````

Any better/simple/more efficient solution?

Your solution fails for array {4,5,1,2,3} and key=4. I think a modification in second part will solve the problem

``````else{
//second half is sorted

if(key>a[mid] && key<=a[end]){// modified condition
start= mid+1;
}else{
end =mid-1;
}
``````

But I think condition if((end-start)==1 ) can be skipped by making some modifications, can any one suggest?

I suppose this condition is not required at all. Can u suggest a test case which fails for your modified code.

``````public static int srch(int a[],int start,int end,int key){
if(start>end)
return -1;

int mid = (start+end)/2;

if(a[mid]== key){
return mid;
}
else{
if(a[start] < a[mid] ){
//first half is sorted
if(key>a[mid]|| key <a[start]){
start= mid+1;
}else{
end =mid-1;
}
}else{
//second half is sorted

if(key>a[mid] && key<=a[high]){
start= mid+1;
}else{
end =mid-1;
}
}
return srch(a, start, end, key);
}
}
``````

Your solution is running in O(log n), so there cannot be a more efficient solution. Maybe parts of your code could be optimized, but that will not effect the running time in terms of O. As you said, the code works and returns the correct values, therefore I'd say it's the correct answer for your interview question.

I haven't checked your code thoroughly for correctness, but your solution is O(log n). You cannot have a better solution algorithmically.