# Convert Recursion to Iteration

I'm trying to convert this recursive method to an iterative and I'm a bit stuck as my book doesn't explain it enough. This method searches an array between two values for a specific value and returns the index. Any help or a point in the right direction would be appreciated.

public static int binarySearch(int anArray[], int first, int last, int value) {
int index;

if (first > last) {
index = -1;
} else {
int mid = (first + last) / 2;

if(value == anArray[mid]) {
index = mid;
} else if(value < anArray[mid]) { //Point x
index = binarySearch(anArray, first, mid - 1, value);
} else { //Point Y
index = binarySearch(anArray, mid + 1, last, value);
}
}

return index;
}
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Is it an exercise? Maybe you should think about it one more time, and then you will able to figure it out. –  Adam Arold Sep 17 '12 at 23:05
... you know most people try to do the exact opposite. Convert iterative to recursive. –  Roddy of the Frozen Peas Sep 17 '12 at 23:05

In this is instance, it's actually a pretty easy conversion. Basically, you just wrap your entire thing in a loop, and modify your parameters rather than making recursive calls.

In situations where you have multiple recursive calls in a function (such as traversing a tree), it becomes much more complicated; however, in this case the iterative version and the recursive version are almost identical.

public static int binarySearch(int anArray[], int first, int last, int value) {

do {
if (first > last) {
return -1;
} else {
int mid = (first + last) / 2;

if(value == anArray[mid]) {
return mid;
} else if(value < anArray[mid]) { //Point x
last = mid - 1;
//index = binarySearch(anArray, first, mid - 1, value);
} else { //Point Y
first = mid + 1;
//index = binarySearch(anArray, mid + 1, last, value);
}
}
}
while(true);
}
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This can be done when you've got tail calls. Consider that

int f(int x, int y) {
if (x == 0) { return y; }
return f(y - 1, x);
}

is equivalent to

int f(int x, int y) {
while (true) {
// The body of your method goes here as normal.
if (x == 0) { return y; }
// Instead of returning the result of a recursive call though,
// compute the parameters to tail call
int newX = y - 1;
int newY = x;
// overwrite parameters with values to tail call
x = newX;
y = newY;
// let the loop jump us back to the top of the method.
continue;  // You can put continue in place of return
}
}

These aren't quite semantically equivalent when your method calls other methods because Java allows Call stack introspection but you're unlikely to run into problems as a result of the call stack being different to a callee -- the most likely problem you'll run into is you'll get an infinite loop instead of a StackOverflowError.

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You do it like this. Identify the arguments and make them into loop variables. Instead of calling the function, update the variables. Instead of returning from function - exit from the loop:

public static int binarySearch(int anArray[], int first, int last, int value) {
int index;
int done = 0;              // LOOP CONTROL

while (done == 0) {        // A LOOP:

if (first > last) {
index = -1;          // RETURN ---> EXIT FROM LOOP
done = 1;
} else {
int mid = (first + last) / 2;

if(value == anArray[mid]) {
index = mid;     // RETURN ---> EXIT FROM LOOP
done = 1;
} else if(value < anArray[mid]) { //Point x
// index = binarySearch(anArray, first, mid - 1, value);
// CALL ---> UPDATE THE VARIABLES
last = mid-1;
} else { //Point Y
// index = binarySearch(anArray, mid + 1, last, value);
// CALL ---> UPDATE THE VARIABLES
first = mid+1;
}
}
} // END LOOP

return index;
}
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I can asume that, on the first call of this method, first=0 and last=anArray.length.

Starting there, I would propose the following

public static int binarySearch_iterative(int[] anArray, int value) {
int first, last, mid, index;
first = 0;
last = anArray.length - 1; // The last cell of the array

while(first <= last) {
mid = (first + last) / 2;
if(anArray[mid] == value) {
index = mid;
break;
} else {
if(value < anArray[mid]) {
last = mid;
} else {
first = mid;
}
}
if(first > last) {
index = -1;
break;
}
}
return index;
}

I hope this helps you.

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