# Boolean array reordering in O(1) space and O(n) time

The problem is taken from Elements of Programming Interviews:

Given an array A of n objects with Boolean-valued keys, reorder the array so that objects that have the key false appear first. The relative ordering of objects with key true should not change. Use O(1) additional space and O(n) time.

I did the following, it preserves the relative ordering of objects with key true and uses O(1) additional space, but I believe its time complexity is O(n*n!).

``````public static void rearrangeVariant4(Boolean[] a) {
int lastFalseIdx = 0;
for (int i = 0; i < a.length; i++) {
if (a[i].equals(false)) {
int falseIdx = i;
while (falseIdx > lastFalseIdx) {
swap(a, falseIdx, falseIdx-1);
falseIdx--;
}
lastFalseIdx++;
}
}
}
``````

Anyone has an idea on how to solve it in O(n) time?

``````boolean array[n]; // The array
int lastTrue = n;
for (int i = n-1; i >= 0; --i) {
if (array[i]) {
swap(array[--lastTrue], array[i]);
}
}
``````

After every iteration all elements after `lastTrue` are true. No two true elements are swapped because if there was a true element between `i` and `lastTrue` it would have been encountered already and moved behind `lastTrue`. This runs in `O(n)` time and `O(1)` memory.

• very nice! clean and efficient! Apr 18, 2015 at 23:49
• The OP only required the relative ordering among true values to be preserved. Apr 19, 2015 at 0:08
• @Ricky Don't fall into this trap. In any case we are talking about Java so ints (and array sizes) are limited to 32bit, so assuming constant time for operations on and memory for single numbers is both more useful and simpler.
– Voo
Apr 19, 2015 at 9:26
• @Ricky Yes it all depends on what computation model you want to use. It turns out that for a large variety of algorithms assuming that single integers take O(1) space and O(1) time for simple arithmetic operations is the most useful. Hence for many problems assuming that `reduce(arr, (t, e) -> t + e)` being O(n) is perfectly fine, although yes you could also go with O(nm) with m being the bit size - and for some problems this will indeed make a big difference.
– Voo
Apr 19, 2015 at 11:46
• I would consider it an improvement if the decrement did not occur inline. =/ Less to think about, less confusion. Apr 19, 2015 at 17:05

# `Java` Code - if you are using a `Boolean[]` - objects:

Time - O(1), Space - O(1)

``````public static <T> void swap(T[] a, int i, int j) {
T t = a[i];
a[i] = a[j];
a[j] = t;
}
``````

Time - O(N), Space - O(1)

``````public static Boolean[] getReorderBoolObjects(Boolean[] array) {
int lastFalse = 0;

for (int i = 0; i < array.length; i++) {
if (!array[i]) {
swap(array, lastFalse++, i);
}
}

return array;
}
``````

### `Spock` Test Case:

``````def "reorder bools - objects"() {
given:
Boolean[] b = [false, true, true, true, false, true]

when:
getReorderBoolObjects(b)

then:
b == [false, false, true, true, true, true]
}
``````

# `Java` Code - if you are using a `boolean[]` - primitives:

Time - O(N), Space - O(1)

``````public static boolean[] getReorderBoolPrimitives(boolean[] array) {
int falseCount = 0;
for (final boolean bool : array) {
if (!bool) {
falseCount++;
}
}
for (int i = 0; i < array.length; i++) {
array[i] = i >= falseCount;
}
return array;
}
``````

### `Spock` Test Case:

``````def "reorder bools - primitives"() {
given:
boolean[] b = [false, true, true, true, false, true]

when:
getReorderBoolPrimitives(b)

then:
b == [false, false, true, true, true, true]
}
``````
• The array contains objects with a boolean field. The whole object needs to be swapped into new position, not just the truth value. Apr 18, 2015 at 23:35
• "given an array A of n objects with Boolean-valued keys" Apr 18, 2015 at 23:44
• @EdwardDoolittle You are right, I read the question title as `boolean[]`. Apr 18, 2015 at 23:54
• It does not preserve the order. I know that boolean is simply too primitive to see consequences of not preserving the order of true elements. Apr 17, 2019 at 22:37

Let the array have 0 based index and let it have `n` elements. Then you can do the following ( pseudo code below )

``````     // A[] is your array
i = 0
k = 0
for i from 0 to n-1
if A[i] is true
swap A[i] and A[k]
increment k
``````

Time complexity is `O(n)` and extra space is only used for two variables `i` and `j` so memory is `O(1)`. This way ordering is preserved amongst false and true values. ( This method puts true ones first you can change it according to your requirement ).

• Yes the ordering is preserved, but the array starts with true values instead of false. (Maybe reversing it in O(n) time would do the trick ?) Apr 18, 2015 at 23:33
• Just do it back to front instead of front to back.
– rici
Apr 18, 2015 at 23:37
• or just test for false values instead of true. change `if A[i] is true` to `if A[i] is false` Apr 18, 2015 at 23:39
• @ubica: Nope. That will preserve the order of the false-keyed elements while putting them at the beginning. What you want is to preserve the order of the true-keyed elements while putting them at the end.
– rici
Apr 18, 2015 at 23:42
• Replace `true` with `false`. Doesn't this then reorder some of the true values? You need to insert rather than swap, no? Apr 18, 2015 at 23:43

Observe that 2k for fixed k is O(1), and 2n is O(n). Construct a second array, and copy elements from the source array to the target array, adding elements with key `false` at one end and key `true` at the other. you can scan the array once to find out where the boundary must be.

• The OP wanted O(1) additional space. How can you create an additional array in O(1) space. What is k referring to? Apr 18, 2015 at 23:32
``````public static void rearrange(boolean[] arr) {
int invariant = arr.length-1;
for (int i = arr.length -1; i >= 0; i --) {
if ( !arr[i] ) {
swap( arr,i,invariant);
invariant--;
}
}
}
private static void swap(boolean arr[] , int from ,int to){
boolean temp = arr[from];
arr[from]=arr[to];
arr[to]=temp;
}
``````
• While this code may answer the question, providing additional context regarding how and/or why it solves the problem would improve the answer's long-term value.
– mech
Feb 26, 2016 at 7:06