An interesting interview question that a colleague of mine uses:
Suppose that you are given a very long, unsorted list of unsigned 64-bit integers. How would you find the smallest non-negative integer that does not occur in the list?
FOLLOW-UP: Now that the obvious solution by sorting has been proposed, can you do it faster than O(n log n)?
FOLLOW-UP: Your algorithm has to run on a computer with, say, 1GB of memory
CLARIFICATION: The list is in RAM, though it might consume a large amount of it. You are given the size of the list, say N, in advance.
If the datastructure can be mutated in place and supports random access then you can do it in O(N) time and O(1) additional space. Just go through the array sequentially and for every index write the value at the index to the index specified by value, recursively placing any value at that location to its place and throwing away values > N. Then go again through the array looking for the spot where value doesn't match the index - that's the smallest value not in the array. This results in at most 3N comparisons and only uses a few values worth of temporary space.
# Pass 1, move every value to the position of its value
for cursor in range(N):
target = array[cursor]
while target < N and target != array[target]:
new_target = array[target]
array[target] = target
target = new_target
# Pass 2, find first location where the index doesn't match the value
for cursor in range(N):
if array[cursor] != cursor:
return cursor
return N
Here's a simple O(N) solution that uses O(N) space. I'm assuming that we are restricting the input list to non-negative numbers and that we want to find the first non-negative number that is not in the list.
Find the length of the list; lets say it is N.
Allocate an array of N booleans, initialized to all false.
For each number X in the list, if X is less than N, set the X'th element of the array to true.
Scan the array starting from index 0, looking for the first element that is false. If you find the first false at index I, then I is the answer. Otherwise (i.e. when all elements are true) the answer is N.
In practice, the "array of N booleans" would probably be encoded as a "bitmap" or "bitset" represented as a byte or int array. This typically uses less space (depending on the programming language) and allows the scan for the first false to be done more quickly.
This is how / why the algorithm works.
Suppose that the N numbers in the list are not distinct, or that one or more of them is greater than N. This means that there must be at least one number in the range 0 .. N - 1 that is not in the list. So the problem of find the smallest missing number must therefore reduce to the problem of finding the smallest missing number less than N. This means that we don't need to keep track of numbers that are greater or equal to N ... because they won't be the answer.
The alternative to the previous paragraph is that the list is a permutation of the numbers from 0 .. N - 1. In this case, step 3 sets all elements of the array to true, and step 4 tells us that the first "missing" number is N.
The computational complexity of the algorithm is O(N) with a relatively small constant of proportionality. It makes two linear passes through the list, or just one pass if the list length is known to start with. There is no need to represent the hold the entire list in memory, so the algorithm's asymptotic memory usage is just what is needed to represent the array of booleans; i.e. O(N) bits.
(By contrast, algorithms that rely on in-memory sorting or partitioning assume that you can represent the entire list in memory. In the form the question was asked, this would require O(N) 64-bit words.)
#Jorn comments that steps 1 through 3 are a variation on counting sort. In a sense he is right, but the differences are significant:
A counting sort requires an array of (at least) Xmax - Xmin counters where Xmax is the largest number in the list and Xmin is the smallest number in the list. Each counter has to be able to represent N states; i.e. assuming a binary representation it has to have an integer type (at least) ceiling(log2(N)) bits.
To determine the array size, a counting sort needs to make an initial pass through the list to determine Xmax and Xmin.
The minimum worst-case space requirement is therefore ceiling(log2(N)) * (Xmax - Xmin) bits.
By contrast, the algorithm presented above simply requires N bits in the worst and best cases.
However, this analysis leads to the intuition that if the algorithm made an initial pass through the list looking for a zero (and counting the list elements if required), it would give a quicker answer using no space at all if it found the zero. It is definitely worth doing this if there is a high probability of finding at least one zero in the list. And this extra pass doesn't change the overall complexity.
EDIT: I've changed the description of the algorithm to use "array of booleans" since people apparently found my original description using bits and bitmaps to be confusing.
Since the OP has now specified that the original list is held in RAM and that the computer has only, say, 1GB of memory, I'm going to go out on a limb and predict that the answer is zero.
1GB of RAM means the list can have at most 134,217,728 numbers in it. But there are 264 = 18,446,744,073,709,551,616 possible numbers. So the probability that zero is in the list is 1 in 137,438,953,472.
In contrast, my odds of being struck by lightning this year are 1 in 700,000. And my odds of getting hit by a meteorite are about 1 in 10 trillion. So I'm about ten times more likely to be written up in a scientific journal due to my untimely death by a celestial object than the answer not being zero.
As pointed out in other answers you can do a sort, and then simply scan up until you find a gap.
You can improve the algorithmic complexity to O(N) and keep O(N) space by using a modified QuickSort where you eliminate partitions which are not potential candidates for containing the gap.
On the first partition phase, remove duplicates.
Once the partitioning is complete look at the number of items in the lower partition
Is this value equal to the value used for creating the partition?
If so then it implies that the gap is in the higher partition.
Continue with the quicksort, ignoring the lower partition
Otherwise the gap is in the lower partition
Continue with the quicksort, ignoring the higher partition
This saves a large number of computations.
To illustrate one of the pitfalls of O(N) thinking, here is an O(N) algorithm that uses O(1) space.
for i in [0..2^64):
if i not in list: return i
print "no 64-bit integers are missing"
Since the numbers are all 64 bits long, we can use radix sort on them, which is O(n). Sort 'em, then scan 'em until you find what you're looking for.
if the smallest number is zero, scan forward until you find a gap. If the smallest number is not zero, the answer is zero.
For a space efficient method and all values are distinct you can do it in space O( k ) and time O( k*log(N)*N ). It's space efficient and there's no data moving and all operations are elementary (adding subtracting).
set U = N; L=0
First partition the number space in k regions. Like this:
0->(1/k)*(U-L) + L, 0->(2/k)*(U-L) + L, 0->(3/k)*(U-L) + L ... 0->(U-L) + L
Find how many numbers (count{i}) are in each region. (N*k steps)
Find the first region (h) that isn't full. That means count{h} < upper_limit{h}. (k steps)
if h - count{h-1} = 1 you've got your answer
set U = count{h}; L = count{h-1}
goto 2
this can be improved using hashing (thanks for Nic this idea).
same
First partition the number space in k regions. Like this:
L + (i/k)->L + (i+1/k)*(U-L)
inc count{j} using j = (number - L)/k (if L < number < U)
find first region (h) that doesn't have k elements in it
if count{h} = 1 h is your answer
set U = maximum value in region h L = minimum value in region h
This will run in O(log(N)*N).
I'd just sort them then run through the sequence until I find a gap (including the gap at the start between zero and the first number).
In terms of an algorithm, something like this would do it:
def smallest_not_in_list(list):
sort(list)
if list[0] != 0:
return 0
for i = 1 to list.last:
if list[i] != list[i-1] + 1:
return list[i-1] + 1
if list[list.last] == 2^64 - 1:
assert ("No gaps")
return list[list.last] + 1
Of course, if you have a lot more memory than CPU grunt, you could create a bitmask of all possible 64-bit values and just set the bits for every number in the list. Then look for the first 0-bit in that bitmask. That turns it into an O(n) operation in terms of time but pretty damned expensive in terms of memory requirements :-)
I doubt you could improve on O(n) since I can't see a way of doing it that doesn't involve looking at each number at least once.
The algorithm for that one would be along the lines of:
def smallest_not_in_list(list):
bitmask = mask_make(2^64) // might take a while :-)
mask_clear_all (bitmask)
for i = 1 to list.last:
mask_set (bitmask, list[i])
for i = 0 to 2^64 - 1:
if mask_is_clear (bitmask, i):
return i
assert ("No gaps")
Sort the list, look at the first and second elements, and start going up until there is a gap.
We could use a hash table to hold the numbers. Once all numbers are done, run a counter from 0 till we find the lowest. A reasonably good hash will hash and store in constant time, and retrieves in constant time.
for every i in X // One scan Θ(1)
hashtable.put(i, i); // O(1)
low = 0;
while (hashtable.get(i) <> null) // at most n+1 times
low++;
print low;
The worst case if there are n elements in the array, and are {0, 1, ... n-1}, in which case, the answer will be obtained at n, still keeping it O(n).
You can do it in O(n) time and O(1) additional space, although the hidden factor is quite large. This isn't a practical way to solve the problem, but it might be interesting nonetheless.
For every unsigned 64-bit integer (in ascending order) iterate over the list until you find the target integer or you reach the end of the list. If you reach the end of the list, the target integer is the smallest integer not in the list. If you reach the end of the 64-bit integers, every 64-bit integer is in the list.
Here it is as a Python function:
def smallest_missing_uint64(source_list):
the_answer = None
target = 0L
while target < 2L**64:
target_found = False
for item in source_list:
if item == target:
target_found = True
if not target_found and the_answer is None:
the_answer = target
target += 1L
return the_answer
This function is deliberately inefficient to keep it O(n). Note especially that the function keeps checking target integers even after the answer has been found. If the function returned as soon as the answer was found, the number of times the outer loop ran would be bound by the size of the answer, which is bound by n. That change would make the run time O(n^2), even though it would be a lot faster.
Thanks to egon, swilden, and Stephen C for my inspiration. First, we know the bounds of the goal value because it cannot be greater than the size of the list. Also, a 1GB list could contain at most 134217728 (128 * 2^20) 64-bit integers.
Hashing part
I propose using hashing to dramatically reduce our search space. First, square root the size of the list. For a 1GB list, that's N=11,586. Set up an integer array of size N. Iterate through the list, and take the square root* of each number you find as your hash. In your hash table, increment the counter for that hash. Next, iterate through your hash table. The first bucket you find that is not equal to it's max size defines your new search space.
Bitmap part
Now set up a regular bit map equal to the size of your new search space, and again iterate through the source list, filling out the bitmap as you find each number in your search space. When you're done, the first unset bit in your bitmap will give you your answer.
This will be completed in O(n) time and O(sqrt(n)) space.
(*You could use use something like bit shifting to do this a lot more efficiently, and just vary the number and size of buckets accordingly.)
Well if there is only one missing number in a list of numbers, the easiest way to find the missing number is to sum the series and subtract each value in the list. The final value is the missing number.
int i = 0;
while ( i < Array.Length)
{
if (Array[i] == i + 1)
{
i++;
}
if (i < Array.Length)
{
if (Array[i] <= Array.Length)
{//SWap
int temp = Array[i];
int AnoTemp = Array[temp - 1];
Array[temp - 1] = temp;
Array[i] = AnoTemp;
}
else
i++;
}
}
for (int j = 0; j < Array.Length; j++)
{
if (Array[j] > Array.Length)
{
Console.WriteLine(j + 1);
j = Array.Length;
}
else
if (j == Array.Length - 1)
Console.WriteLine("Not Found !!");
}
}
Here's my answer written in Java:
Basic Idea:
1- Loop through the array throwing away duplicate positive, zeros, and negative numbers while summing up the rest, getting the maximum positive number as well, and keep the unique positive numbers in a Map.
2- Compute the sum as max * (max+1)/2.
3- Find the difference between the sums calculated at steps 1 & 2
4- Loop again from 1 to the minimum of [sums difference, max] and return the first number that is not in the map populated in step 1.
public static int solution(int[] A) {
if (A == null || A.length == 0) {
throw new IllegalArgumentException();
}
int sum = 0;
Map<Integer, Boolean> uniqueNumbers = new HashMap<Integer, Boolean>();
int max = A[0];
for (int i = 0; i < A.length; i++) {
if(A[i] < 0) {
continue;
}
if(uniqueNumbers.get(A[i]) != null) {
continue;
}
if (A[i] > max) {
max = A[i];
}
uniqueNumbers.put(A[i], true);
sum += A[i];
}
int completeSum = (max * (max + 1)) / 2;
for(int j = 1; j <= Math.min((completeSum - sum), max); j++) {
if(uniqueNumbers.get(j) == null) { //O(1)
return j;
}
}
//All negative case
if(uniqueNumbers.isEmpty()) {
return 1;
}
return 0;
}
As Stephen C smartly pointed out, the answer must be a number smaller than the length of the array. I would then find the answer by binary search. This optimizes the worst case (so the interviewer can't catch you in a 'what if' pathological scenario). In an interview, do point out you are doing this to optimize for the worst case.
The way to use binary search is to subtract the number you are looking for from each element of the array, and check for negative results.
I like the "guess zero" apprach. If the numbers were random, zero is highly probable. If the "examiner" set a non-random list, then add one and guess again:
LowNum=0
i=0
do forever {
if i == N then leave /* Processed entire array */
if array[i] == LowNum {
LowNum++
i=0
}
else {
i++
}
}
display LowNum
The worst case is n*N with n=N, but in practice n is highly likely to be a small number (eg. 1)
I am not sure if I got the question. But if for list 1,2,3,5,6 and the missing number is 4, then the missing number can be found in O(n) by:
(n+2)(n+1)/2-(n+1)n/2
EDIT: sorry, I guess I was thinking too fast last night. Anyway, The second part should actually be replaced by sum(list), which is where O(n) comes. The formula reveals the idea behind it: for n sequential integers, the sum should be (n+1)*n/2. If there is a missing number, the sum would be equal to the sum of (n+1) sequential integers minus the missing number.
Thanks for pointing out the fact that I was putting some middle pieces in my mind.
Well done Ants Aasma! I thought about the answer for about 15 minutes and independently came up with an answer in a similar vein of thinking to yours:
#define SWAP(x,y) { numerictype_t tmp = x; x = y; y = tmp; }
int minNonNegativeNotInArr (numerictype_t * a, size_t n) {
int m = n;
for (int i = 0; i < m;) {
if (a[i] >= m || a[i] < i || a[i] == a[a[i]]) {
m--;
SWAP (a[i], a[m]);
continue;
}
if (a[i] > i) {
SWAP (a[i], a[a[i]]);
continue;
}
i++;
}
return m;
}
m represents "the current maximum possible output given what I know about the first i inputs and assuming nothing else about the values until the entry at m-1".
This value of m will be returned only if (a[i], ..., a[m-1]) is a permutation of the values (i, ..., m-1). Thus if a[i] >= m or if a[i] < i or if a[i] == a[a[i]] we know that m is the wrong output and must be at least one element lower. So decrementing m and swapping a[i] with the a[m] we can recurse.
If this is not true but a[i] > i then knowing that a[i] != a[a[i]] we know that swapping a[i] with a[a[i]] will increase the number of elements in their own place.
Otherwise a[i] must be equal to i in which case we can increment i knowing that all the values of up to and including this index are equal to their index.
The proof that this cannot enter an infinite loop is left as an exercise to the reader. :)
The Dafny fragment from Ants' answer shows why the in-place algorithm may fail. The requires pre-condition describes that the values of each item must not go beyond the bounds of the array.
method AntsAasma(A: array<int>) returns (M: int)
requires A != null && forall N :: 0 <= N < A.Length ==> 0 <= A[N] < A.Length;
modifies A;
{
// Pass 1, move every value to the position of its value
var N := A.Length;
var cursor := 0;
while (cursor < N)
{
var target := A[cursor];
while (0 <= target < N && target != A[target])
{
var new_target := A[target];
A[target] := target;
target := new_target;
}
cursor := cursor + 1;
}
// Pass 2, find first location where the index doesn't match the value
cursor := 0;
while (cursor < N)
{
if (A[cursor] != cursor)
{
return cursor;
}
cursor := cursor + 1;
}
return N;
}
Paste the code into the validator with and without the forall ... clause to see the verification error. The second error is a result of the verifier not being able to establish a termination condition for the Pass 1 loop. Proving this is left to someone who understands the tool better.
Here's an answer in Java that does not modify the input and uses O(N) time and N bits plus a small constant overhead of memory (where N is the size of the list):
int smallestMissingValue(List<Integer> values) {
BitSet bitset = new BitSet(values.size() + 1);
for (int i : values) {
if (i >= 0 && i <= values.size()) {
bitset.set(i);
}
}
return bitset.nextClearBit(0);
}
def solution(A):
index = 0
target = []
A = [x for x in A if x >=0]
if len(A) ==0:
return 1
maxi = max(A)
if maxi <= len(A):
maxi = len(A)
target = ['X' for x in range(maxi+1)]
for number in A:
target[number]= number
count = 1
while count < maxi+1:
if target[count] == 'X':
return count
count +=1
return target[count-1] + 1
Got 100% for the above solution.
1)Filter negative and Zero
2)Sort/distinct
3)Visit array
Complexity: O(N) or O(N * log(N))
using Java8
public int solution(int[] A) {
int result = 1;
boolean found = false;
A = Arrays.stream(A).filter(x -> x > 0).sorted().distinct().toArray();
//System.out.println(Arrays.toString(A));
for (int i = 0; i < A.length; i++) {
result = i + 1;
if (result != A[i]) {
found = true;
break;
}
}
if (!found && result == A.length) {
//result is larger than max element in array
result++;
}
return result;
}
An unordered_set can be used to store all the positive numbers, and then we can iterate from 1 to length of unordered_set, and see the first number that does not occur.
int firstMissingPositive(vector<int>& nums) {
unordered_set<int> fre;
// storing each positive number in a hash.
for(int i = 0; i < nums.size(); i +=1)
{
if(nums[i] > 0)
fre.insert(nums[i]);
}
int i = 1;
// Iterating from 1 to size of the set and checking
// for the occurrence of 'i'
for(auto it = fre.begin(); it != fre.end(); ++it)
{
if(fre.find(i) == fre.end())
return i;
i +=1;
}
return i;
}
Solution through basic javascript
var a = [1, 3, 6, 4, 1, 2];
function findSmallest(a) {
var m = 0;
for(i=1;i<=a.length;i++) {
j=0;m=1;
while(j < a.length) {
if(i === a[j]) {
m++;
}
j++;
}
if(m === 1) {
return i;
}
}
}
console.log(findSmallest(a))
Hope this helps for someone.
With python it is not the most efficient, but correct
#!/usr/bin/env python3
# -*- coding: UTF-8 -*-
import datetime
# write your code in Python 3.6
def solution(A):
MIN = 0
MAX = 1000000
possible_results = range(MIN, MAX)
for i in possible_results:
next_value = (i + 1)
if next_value not in A:
return next_value
return 1
test_case_0 = [2, 2, 2]
test_case_1 = [1, 3, 44, 55, 6, 0, 3, 8]
test_case_2 = [-1, -22]
test_case_3 = [x for x in range(-10000, 10000)]
test_case_4 = [x for x in range(0, 100)] + [x for x in range(102, 200)]
test_case_5 = [4, 5, 6]
print("---")
a = datetime.datetime.now()
print(solution(test_case_0))
print(solution(test_case_1))
print(solution(test_case_2))
print(solution(test_case_3))
print(solution(test_case_4))
print(solution(test_case_5))
def solution(A):
A.sort()
j = 1
for i, elem in enumerate(A):
if j < elem:
break
elif j == elem:
j += 1
continue
else:
continue
return j
this can help:
0- A is [5, 3, 2, 7];
1- Define B With Length = A.Length; (O(1))
2- initialize B Cells With 1; (O(n))
3- For Each Item In A:
if (B.Length <= item) then B[Item] = -1 (O(n))
4- The answer is smallest index in B such that B[index] != -1 (O(n))
Related
I am new and learning Data structure and algorithm, I need help to solve this question
The best of an array having N elements is defined as sum of best of all elements of Array. The best of element A[i] is defined in the following manner
a: The best of element A[i] is 1 if, A[i-1]<A[i]<A[i+1]
b: The best of element A[i] is 2 if, A[i]> A[j] for j ranging from 0 to n-1
and A[i]<A[h] for h ranging from i+1 to N-1
Write program to find best of array
Note- A[0] and A[N-1] are excluded to find best of array, all elements are unique
Input - 2,1,3,9,20,7,8
Output - 3
The best of element 3 is 2 and 9 is 1. For rest element it is 0. Hence 2+1 =3
This is what I tried so far -
public static void main (String [] args) {
int [] A = {2,1,3,9,20,7,8};
int result = 0;
for(int i=1; i<A.length-2; i++) {
if(A[i-1] < A[i] && A[i]< A[i+1] ) {
result += 1;
}else if(A[i]>A[j] && A[i]<A[h]){
result +=2;
}else {
result+=0;
}
}
}
Note how the phrase:
A[i]> A[j] for j ranging from 0 to n-1
simply means: If the current element is not the Minimum of the array. Hence, if you find the minimum at the beginning, this condition can be changed into a much simpler and lightweight condition:
Let m be the minimum of the array, then if A[i] > m
So you don't need to do a linear search every iteration --> Less time complexity.
Now you have the problem with a complexity of O(N^2), ..which can be reduced further.
Regarding
and A[i]<A[h] for h ranging from i+1 to N-1
Get the maximum element from 2 to N-1. Then at every iteration, check if the current element is less than the maximum. If so, consider it while composing the score, otherwise, that means the current element is the maximum, in this case, re-calculate the maximum element from i+1 to N-1.
The worst case scenario is to find the maximum is always at index i where the array is already sorted in descending order.
Whereas the best case scenario is if the maximum is always the last element, hence the overall complexity is reduced to O(N).
Regarding
A[i-1]<A[i]<A[i+1]
This is straightforward, you simply compare the elements reside at those three indices at every iteration.
Implementation
Before anything, the following are important notes:
The result you've got in your example isn't correct as elements 3 and 9 both fulfill both conditions, so each should score either 1 or 2, but cannot be one with score of 1 and another with score of 2. Hence the overall score should be either 1+1 = 2 or 2 + 2 = 4.
I implemented this algorithm in Java (although I prefer Python), as I could guess it from your code snippet.
import java.util.Arrays;
public class ArrayBest {
private static int[] findMinMax(Integer [] B) {
// find minimum and the maximum: Time Complexity O(n log(n))
Integer[] b = Arrays.copyOf(B, B.length);
Arrays.sort(b);
return new int []{b[0], b[B.length-1]};
}
public static int find(Integer [] A) {
// Exclude the first and last elements
int N = A.length;
Integer [] B = Arrays.copyOfRange(A, 1, N-1);
N -= 2;
// find minimum and the maximum: Time Complexity O(n log(n))
// min at index 0, and max at index 1
int [] minmax = findMinMax(B);
int result = 0;
// start the search
for (int i=0; i<N-1; i++) {
// start with first condition : the easier
if (i!=0 && B[i-1]<B[i] && B[i]<B[i+1]) {
result += 1;
}else if (B[i] != minmax[0]) { // Equivalent to A[i]> A[j] : j in [0, N-1]
if (B[i] < minmax[1]) { // if it is less than the maximum
result += 2;
}else { // it is the maximum --> re-calculate the max over the range (i+1, N)
int [] minmax_ = findMinMax(Arrays.copyOfRange(B, i+1, N));
minmax[1] = minmax_[1];
}
}
}
return result;
}
public static void main(String[] args) {
Integer [] A = {2,1,3,9,7,20,8};
int res = ArrayBest.find(A);
System.out.println(res);
}
}
Ignoring the first sort, the best case scenario is when the last element is the maximum (i.e, at index N-1), hence time complexity is O(N).
The worst case scenario, is when the array is already sorted in a descending order, so the current element that is being processed is always the maximum, hence at each iteration the maximum should be found again. Consequently, the time complexity is O(N^2).
The average case scenario depends on the probability of how the elements are distributed in the array. In other words, the probability that the element being processed at the current iteration is the maximum.
Although it requires more study, my initial guess is as follows:
The probability of any i.i.d element to be the maximum is simply 1/N, and that is at the very beginning, but as we are searching over (i+1, N-1), N will be decreasing, hence the probability will go like: 1/N, 1/(N-1), 1/(N-2), ..., 1. Counting the outer loop, we can write the average complexity as O(N (1/N + 1/(N-1), 1/(N-2), + ... +1)) = O(N (1 + 1/2 + 1/3 + ... + 1/N)) where its asymptotic upper bound (according to Harmonic series) is approximately O(N log(N)).
Interview question from a friend
Given an unsorted integer array, how many number are not able to find using binary search?
For example, [2, 3, 4, 1, 5], only the number 1 can't be find using binary search, hence count = 1
[4,2,1,3,5] 4 and 4 and 2 are not searchable => binarySearch(arr, n) return a number that is not equal to num
Expected run time is O(n)
Can't think of an algorithm that can achieve O(n) time :(
Thought about building min and max arr, however, woudln't work as the subarray can mess it out again.
Already knew the O(nlogn) approach, it was obvious, just call binary search for each number and check.
I believe this code works fine. It does one single walk of each value in the list, so it is O(n).
function CountUnsearchable(list, minValue = -Infinity, maxValue=Infinity) {
if (list is empty) return 0;
let midPoint = mid point of "list"
let lowerCount = CountUnsearchable(left half of list, minValue, min(midPoint, maxValue));
let upperCount = CountUnsearchable(right half of list, max(minValue, midPoint), maxValue);
let midPointUnsearchable = 1 if midPoint less than minValue or greater than maxValue, otherwise 0;
return lowerCount + upperCount + midPointUnsearchable;
}
It works, because we walk the tree a bit like we would in a binary search, except at each node we take both paths, and simply track the maximum value that could have led us to take this path, and the minimum value that could have led us to take this path. That makes it simple to look at the current value and answer the question of whether it can be found via a binary search.
Try to create the following function:
def count_unsearchable(some_list, min_index=None, max_index=None, min_value=None, max_value=None):
"""How many elements of some_list are not searchable in the
range from min_index to max_index, assuming that by the time
we arrive our values are known to be in the range from
min_value to max_value. In all cases None means unbounded."""
pass #implementation TBD
It is possible to implement this function in a way that runs in time O(n). The reason why it is faster than the naive approach is that you are only making the recursive calls once per range, instead of once per element in that range.
Idea: Problem can be reworded as - find the count of numbers in the array which are greater than all numbers to their left and smaller than all numbers to their right. Further simplified, find the count of numbers which are greater than the max number to their left and smaller than the minimum number to their right.
Code: Java 11 | Time/Space: O(n)/O(n)
int binarySearchable(int[] nums) {
var n = nums.length;
var maxToLeft = new int[n + 1];
maxToLeft[0] = Integer.MIN_VALUE;
var minToRight = new int[n + 1];
minToRight[n] = Integer.MAX_VALUE;
for (var i = 1; i < n + 1; i++) {
maxToLeft[i] = Math.max(maxToLeft[i - 1], nums[i - 1]);
minToRight[n - i] = Math.min(minToRight[n + 1 - i], nums[n - i]);
}
for (var i = 0; i < n; i++)
if (nums[i] >= maxToLeft[i + 1] && nums[i] <= minToRight[i + 1])
count++;
return count;
}
TopCoder problem: https://community.topcoder.com/stat?c=problem_statement&pm=5869&rd=8078
Video explanation: https://www.youtube.com/watch?v=blICHR_ocDw
LeetCode discuss: https://leetcode.com/discuss/interview-question/352743/Google-or-Onsite-or-Guaranteed-Binary-Search-Numbers
Given an array find the next smaller element in array for each element without changing the original order of the elements.
For example, suppose the given array is 4,2,1,5,3.
The resultant array would be 2,1,-1,3,-1.
I was asked this question in an interview, but i couldn't think of a solution better than the trivial O(n^2) solution.
Any approach that I could think of, i.e. making a binary search tree, or sorting the array, will distort the original order of the elements and hence lead to a wrong result.
Any help would be highly appreciated.
O(N) Algorithm
Initialize output array to all -1s.
Create an empty stack of indexes of items we have visited in the input array but don't yet know the answer for in the output array.
Iterate over each element in the input array:
Is it smaller than the item indexed by the top of the stack?
Yes. It is the first such element to be so. Fill in the corresponding element in our output array, remove the item from the stack, and try again until the stack is empty or the answer is no.
No. Continue to 3.2.
Add this index to the stack. Continue iteration from 3.
Python implementation
def find_next_smaller_elements(xs):
ys=[-1 for x in xs]
stack=[]
for i,x in enumerate(xs):
while len(stack)>0 and x<xs[stack[-1]]:
ys[stack.pop()]=x
stack.append(i)
return ys
>>> find_next_smaller_elements([4,2,1,5,3])
[2, 1, -1, 3, -1]
>>> find_next_smaller_elements([1,2,3,4,5])
[-1, -1, -1, -1, -1]
>>> find_next_smaller_elements([5,4,3,2,1])
[4, 3, 2, 1, -1]
>>> find_next_smaller_elements([1,3,5,4,2])
[-1, 2, 4, 2, -1]
>>> find_next_smaller_elements([6,4,2])
[4, 2, -1]
Explanation
How it works
This works because whenever we add an item to the stack, we know its value is greater or equal to every element in the stack already. When we visit an element in the array, we know that if it's lower than any item in the stack, it must be lower than the last item in the stack, because the last item must be the largest. So we don't need to do any kind of search on the stack, we can just consider the last item.
Note: You can skip the initialization step so long as you add a final step to empty the stack and use each remaining index to set the corresponding output array element to -1. It's just easier in Python to initialize it to -1s when creating it.
Time complexity
This is O(N). The main loop clearly visits each index once. Each index is added to the stack exactly once and removed at most once.
Solving as an interview question
This kind of question can be pretty intimidating in an interview, but I'd like to point out that (hopefully) an interviewer isn't going to expect the solution to spring from your mind fully-formed. Talk them through your thought process. Mine went something like this:
Is there some relationship between the positions of numbers and their next smaller number in the array? Does knowing some of them constrain what the others might possibly be?
If I were in front of a whiteboard I would probably sketch out the example array and draw lines between the elements. I might also draw them as a 2D bar graph - horizontal axis being position in input array and vertical axis being value.
I had a hunch this would show a pattern, but no paper to hand. I think the diagram would make it obvious. Thinking about it carefully, I could see that the lines would not overlap arbitrarily, but would only nest.
Around this point, it occurred to me that this is incredibly similar to the algorithm Python uses internally to transform indentation into INDENT and DEDENT virtual tokens, which I'd read about before. See "How does the compiler parse the indentation?" on this page: http://www.secnetix.de/olli/Python/block_indentation.hawk However, it wasn't until I actually worked out an algorithm that I followed up on this thought and determined that it was in fact the same, so I don't think it helped too much. Still, if you can see a similarity to some other problem you know, it's probably a good idea to mention it, and say how it's similar and how it's different.
From here the general shape of the stack-based algorithm became apparent, but I still needed to think about it a bit more to be sure it would work okay for those elements that have no subsequent smaller element.
Even if you don't come up with a working algorithm, try to let your interviewer see what you're thinking about. Often it is the thought process more than the answer that they're interested in. For a tough problem, failing to find the best solution but showing insight into the problem can be better than knowing a canned answer but not being able to give it much analysis.
Start making a BST, starting from the array end. For each value 'v' answer would be the last node "Right" that you took on your way to inserting 'v', of which you can easily keep track of in recursive or iterative version.
UPDATE:
Going by your requirements, you can approach this in a linear fashion:
If every next element is smaller than the current element(e.g. 6 5 4 3 2 1) you can process this linearly without requiring any extra memory. Interesting case arises when you start getting jumbled elements(e.g. 4 2 1 5 3), in which case you need to remember their order as long as you dont' get their 'smaller counterparts'.
A simple stack based approach goes like this:
Push the first element (a[0]) in a stack.
For each next element a[i], you peek into the stack and if value ( peek() ) is greater than the one in hand a[i], you got your next smaller number for that stack element (peek()) { and keep on popping the elements as long as peek() > a[i] }. Pop them out and print/store the corresponding value.
else, simply push back your a[i] into the stack.
In the end stack 'll contain those elements which never had a value smaller than them(to their right). You can fill in -1 for them in your outpput.
e.g. A=[4, 2, 1, 5, 3];
stack: 4
a[i] = 2, Pop 4, Push 2 (you got result for 4)
stack: 2
a[i] = 1, Pop 2, Push 1 (you got result for 2)
stack: 1
a[i] = 5
stack: 1 5
a[i] = 3, Pop 5, Push 3 (you got result for 5)
stack: 1 3
1,3 don't have any counterparts for them. so store -1 for them.
Assuming you meant first next element which is lower than the current element, here are 2 solutions -
Use sqrt(N) segmentation. Divide the array in sqrt(N) segments with each segment's length being sqrt(N). For each segment calculate its' minimum element using a loop. In this way, you have pre-calculated each segments' minimum element in O(N). Now, for each element, the next lower element can be in the same segment as that one or in any of the subsequent segments. So, first check all the next elements in the current segment. If all are larger, then loop through all the subsequent segments to find out which has an element lower than current element. If you couldn't find any, result would be -1. Otherwise, check every element of that segment to find out what is the first element lower than current element. Overall, algorithm complexity is O(N*sqrt(N)) or O(N^1.5).
You can achieve O(NlgN) using a segment tree with a similar approach.
Sort the array ascending first (keeping original position of the elements as satellite data). Now, assuming each element of the array is distinct, for each element, we will need to find the lowest original position on the left side of that element. It is a classic RMQ (Range Min Query) problem and can be solved in many ways including a O(N) one. As we need to sort first, overall complexity is O(NlogN). You can learn more about RMQ in a TopCoder tutorial.
For some reasons, I find it easier to reason about "previous smaller element", aka "all nearest smaller elements". Thus applied backward gives the "next smaller".
For the record, a Python implementation in O(n) time, O(1) space (i.e. without stack), supporting negative values in the array :
def next_smaller(l):
""" Return positions of next smaller items """
res = [None] * len(l)
for i in range(len(l)-2,-1,-1):
j=i+1
while j is not None and (l[j] > l[i]):
j = res[j]
res[i] = j
return res
def next_smaller_elements(l):
""" Return next smaller items themselves """
res = next_smaller(l)
return [l[i] if i is not None else None for i in res]
Here is the javascript code . This video explains the Algo better
function findNextSmallerElem(source){
let length = source.length;
let outPut = [...Array(length)].map(() => -1);
let stack = [];
for(let i = 0 ; i < length ; i++){
let stackTopVal = stack[ stack.length - 1] && stack[ stack.length - 1].val;
// If stack is empty or current elem is greater than stack top
if(!stack.length || source[i] > stackTopVal ){
stack.push({ val: source[i], ind: i} );
} else {
// While stacktop is greater than current elem , keep popping
while( source[i] < (stack[ stack.length - 1] && stack[ stack.length - 1].val) ){
outPut[stack.pop().ind] = source[i];
}
stack.push({ val: source[i], ind: i} );
}
}
return outPut;
}
Output -
findNextSmallerElem([98,23,54,12,20,7,27])
[23, 12, 12, 7, 7, -1, -1]
Time complexity O(N), space complexity O(N).
Clean solution on java keeping order of the array:
public static int[] getNGE(int[] a) {
var s = new Stack<Pair<Integer, Integer>>();
int n = a.length;
var result = new int[n];
s.push(Pair.of(0, a[0]));
for (int i = 1; i < n; i++) {
while (!s.isEmpty() && s.peek().v2 > a[i]) {
var top = s.pop();
result[top.v1] = a[i];
}
s.push(Pair.of(i, a[i]));
}
while (!s.isEmpty()) {
var top = s.pop();
result[top.v1] = -1;
}
return result;
}
static class Pair<K, V> {
K v1;
V v2;
public static <K, V> Pair<K, V> of (K v1, V v2) {
Pair p = new Pair();
p.v1 = v1;
p.v2 = v2;
return p;
}
}
Here is an observation that I think can be made into an O(n log n) solution. Suppose you have the answer for the last k elements of the array. What would you need in order to figure out the value for the element just before this? You can think of the last k elements as being split into a series of ranges, each of which starts at some element and continues forward until it hits a smaller element. These ranges must be in descending order, so you could think about doing a binary search over them to find the first interval smaller than that element. You could then update the ranges to factor in this new element.
Now, how best to represent this? The best way I've thought of is to use a splay tree whose keys are the elements defining these ranges and whose values are the index at which they start. You can then in time O(log n) amortized do a predecessor search to find the predecessor of the current element. This finds the earliest value smaller than the current. Then, in amortized O(log n) time, insert the current element into the tree. This represents defining a new range from that element forward. To discard all ranges this supercedes, you then cut the right child of the new node, which because this is a splay tree is at the root, from the tree.
Overall, this does O(n) iterations of an O(log n) process for total O(n lg n).
Here is a O(n) algorithm using DP (actually O(2n) ):
int n = array.length();
The array min[] record the minimum number found from index i until the end of the array.
int[] min = new int[n];
min[n-1] = array[n-1];
for(int i=n-2; i>=0; i--)
min[i] = Math.min(min[i+1],array[i]);
Search and compare through the original array and min[].
int[] result = new int[n];
result[n-1] = -1;
for(int i=0; i<n-1; i++)
result[i] = min[i+1]<array[i]?min[i+1]:-1;
Here is the new solution to find "next smaller element":
int n = array.length();
int[] answer = new int[n];
answer[n-1] = -1;
for(int i=0; i<n-1; i++)
answer[i] = array[i+1]<array[i]?array[i+1]:-1;
All that is actually not required i think
case 1: a,b
answer : -a+b
case 2: a,b,c
answer : a-2b+c
case 3: a,b,c,d
answer : -a+3b-3c+d
case 4 :a,b,c,d,e
answer : a-4b+6c-4d+e
.
.
.
recognize the pattern in it?
it is the pascal's triangle!
1
1 1
1 2 1
1 3 3 1
1 4 6 4 1
so it can be calculated using Nth row of pascal's triangle!
with alternate + ans - for odd even levels!
it is O(1)
You can solve this in O(n) runtime with O(n) space complexity.
Start with a Stack and keep pushing elements till you find arr[i] such that arr[i] < stack.top element. Then store this index .
Code Snippet:
vector<int> findNext(vector<int> values) {
stack<int> st;
vector<int> nextSmall(values.size(), -1);
st.push(0);
for (int i = 1; i < values.size(); i++) {
while (!st.empty() && values[i] < values[st.top()]) {
// change values[i] < values[st.top()] to values[i] > values[st.top()] to find the next greater element.
nextSmall[st.top()] = i;
st.pop();
}
st.push(i);
}
return nextSmall;
}
Solution with O(1) space complexity and O(n) time complexity.
void replace_next_smallest(int a[], int n)
{
int ns = a[n - 1];
for (int i = n - 1; i >= 0; i--) {
if (i == n - 1) {
a[i] = -1;
}
else if (a[i] > ns) {
int t = ns;
ns = a[i];
a[i] = t;
}
else if (a[i] == ns) {
a[i] = a[i + 1];
}
else {
ns = a[i];
a[i] = -1;
}
}
}
Solution With O(n) Time Complexity and O(1) Space Complexity. This Solution is not complex to understand and implemented without stack.
def min_secMin(a,n):
min = a[0]
sec_min = a[1]
for i in range(1,n):
if(a[i]<min):
sec_min = min
min = a[i]
if(a[i]>min and a[i]<sec_min):
sec_min = a[i]
return min,sec_min
Given an array find the next smaller element in array for each element without changing the original order of the elements.
where arr is the array and n is length of the array..
Using Python logic,
def next_smallest_array(arr,n):
for i in range(0,n-1,1):
if arr[i]>arr[i+1]:
arr[i]=arr[i+1]
else:
arr[i]=-1
arr[n-1]=-1
return arr
Find_next_smaller_elements([4,2,1,5,3])
Output is [2, 1, -1, 3, -1]
Find_next_smaller_elements([1,2,3,4,5])
Output is [-1, -1, -1, -1, -1]
Given an Array arr of size 100000, each element 0 <= arr[i] < 100. (not sorted, contains duplicates)
Find out how many triplets (i,j,k) are present such that arr[i] ^ arr[j] ^ arr[k] == 0
Note : ^ is the Xor operator. also 0 <= i <= j <= k <= 100000
I have a feeling i have to calculate the frequencies and do some calculation using the frequency, but i just can't seem to get started.
Any algorithm better than the obvious O(n^3) is welcome. :)
It's not homework. :)
I think the key is you don't need to identify the i,j,k, just count how many.
Initialise an array size 100
Loop though arr, counting how many of each value there are - O(n)
Loop through non-zero elements of the the small array, working out what triples meet the condition - assume the counts of the three numbers involved are A, B, C - the number of combinations in the original arr is (A+B+C)/!A!B!C! - 100**3 operations, but that's still O(1) assuming the 100 is a fixed value.
So, O(n).
Possible O(n^2) solution, if it works: Maintain variable count and two arrays, single[100] and pair[100]. Iterate the arr, and for each element of value n:
update count: count += pair[n]
update pair: iterate array single and for each element of index x and value s != 0 do pair[s^n] += single[x]
update single: single[n]++
In the end count holds the result.
Possible O(100 * n) = O(n) solution.
it solve problem i <= j <= k.
As you know A ^ B = 0 <=> A = B, so
long long calcTripletsCount( const vector<int>& sourceArray )
{
long long res = 0;
vector<int> count(128);
vector<int> countPairs(128);
for(int i = 0; i < sourceArray.size(); i++)
{
count[sourceArray[i]]++; // count[t] contain count of element t in (sourceArray[0]..sourceArray[i])
for(int j = 0; j < count.size(); j++)
countPairs[j ^ sourceArray[i]] += count[j]; // countPairs[t] contain count of pairs p1, p2 (p1 <= p2 for keeping order) where t = sourceArray[i] ^ sourceArray[j]
res += countPairs[sourceArray[i]]; // a ^ b ^ c = 0 if a ^ b = c, we add count of pairs (p1, p2) where sourceArray[p1] ^ sourceArray[p2] = sourceArray[i]. it easy to see that we keep order(p1 <= p2 <= i)
}
return res;
}
Sorry for my bad English...
I have a (simple) O(n^2 log n) solution which takes into account the fact that i, j and k refer to indices, not integers.
A simple first pass allow us to build an array A of 100 values: values -> list of indices, we keep the list sorted for later use. O(n log n)
For each pair i,j such that i <= j, we compute X = arr[i]^arr[j]. We then perform a binary search in A[X] to locate the number of indices k such that k >= j. O(n^2 log n)
I could not find any way to leverage sorting / counting algorithm because they annihilate the index requirement.
Sort the array, keeping a map of new indices to originals. O(nlgn)
Loop over i,j:i<j. O(n^2)
Calculate x = arr[i] ^ arr[j]
Since x ^ arr[k] == 0, arr[k] = x, so binary search k>j for x. O(lgn)
For all found k, print mapped i,j,k
O(n^2 lgn)
Start with a frequency count of the number of occurrences of each number between 1 and 100, as Paul suggests. This produces an array freq[] of length 100.
Next, instead of looping over triples A,B,C from that array and testing the condition A^B^C=0,
loop over pairs A,B with A < B. For each A,B, calculate C=A^B (so that now A^B^C=0), and verify that A < B < C < 100. (Any triple will occur in some order, so this doesn't miss triples. But see below). The running total will look like:
Sum+=freq[A]*freq[B]*freq[C]
The work is O(n) for the frequency count, plus about 5000 for the loop over A < B.
Since every triple of three different numbers A,B,C must occur in some order, this finds each such triple exactly once. Next you'll have to look for triples in which two numbers are equal. But if two numbers are equal and the xor of three of them is 0, the third number must be zero. So this amounts to a secondary linear search for B over the frequency count array, counting occurrences of (A=0, B=C < 100). (Be very careful with this case, and especially careful with the case B=0. The count is not just freq[B] ** 2 or freq[0] ** 3. There is a little combinatorics problem hiding there.)
Hope this helps!
I found the following problem on the internet, and would like to know how I would go about solving it:
You are given an array ' containing 0s and 1s. Find O(n) time and O(1) space algorithm to find the maximum sub sequence which has equal number of 1s and 0s.
Examples:
10101010 -
The longest sub sequence that satisfies the problem is the input itself
1101000 -
The longest sub sequence that satisfies the problem is 110100
Update.
I have to completely rephrase my answer. (If you had upvoted the earlier version, well, you were tricked!)
Lets sum up the easy case again, to get it out of the way:
Find the longest prefix of the bit-string containing
an equal number of 1s and 0s of the
array.
This is trivial: A simple counter is needed, counting how many more 1s we have than 0s, and iterating the bitstring while maintaining this. The position where this counter becomes zero for the last time is the end of the longest sought prefix. O(N) time, O(1) space. (I'm completely convinced by now that this is what the original problem asked for. )
Now lets switch to the more difficult version of the problem: we no longer require subsequences to be prefixes - they can start anywhere.
After some back and forth thought, I thought there might be no linear algorithm for this. For example, consider the prefix "111111111111111111...". Every single 1 of those may be the start of the longest subsequence, there is no candidate subsequence start position that dominates (i.e. always gives better solutions than) any other position, so we can't throw away any of them (O(N) space) and at any step, we must be able to select the best start (which has an equal number of 1s and 0s to the current position) out of linearly many candidates, in O(1) time. It turns out this is doable, and easily doable too, since we can select the candidate based on the running sum of 1s (+1) and 0s (-1), this has at most size N, and we can store the first position we reach each sum in 2N cells - see pmod's answer below (yellowfog's comments and geometric insight too).
Failing to spot this trick, I had replaced a fast but wrong with a slow but sure algorithm, (since correct algorithms are preferable to wrong ones!):
Build an array A with the accumulated number of 1s from the start to that position, e.g. if the bitstring is "001001001", then the array would be [0, 0, 1, 1, 1, 2, 2, 2, 3]. Using this, we can test in O(1) whether the subsequence (i,j), inclusive, is valid: isValid(i, j) = (j - i + 1 == 2 * (A[j] - A[i - 1]), i.e. it is valid if its length is double the amount of 1s in it. For example, the subsequence (3,6) is valid because 6 - 3 + 1 == 2 * A[6] - A[2] = 4.
Plain old double loop:
maxSubsLength = 0
for i = 1 to N - 1
for j = i + 1 to N
if isValid(i, j) ... #maintain maxSubsLength
end
end
This can be sped up a bit using some branch-and-bound by skipping i/j sequences which are shorter than the current maxSubsLength, but asymptotically this is still O(n^2). Slow, but with a big plus on its side: correct!
Strictly speaking, the answer is that no such algorithm exists because the language of strings consisting of an equal number of zeros and ones is not regular.
Of course everyone ignores that fact that storing an integer of magnitude n is O(log n) in space and treats it as O(1) in space. :-) Pretty much all big-O's, including time ones, are full of (or rather empty of) missing log n factors, or equivalently, they assume n is bounded by the size of a machine word, which means you're really looking at a finite problem and everything is O(1).
New solution:
Suppose we have for n-bit input bit-array 2*n-size array to keep position of bit. So, the size of array element must have enough size to keep maximum position number. For 256 input bit array, it's needed 256x2 array of bytes (byte is enough to keep 255 - the maximum position).
Moving from the first position of bit-array we put the position into array starting from the middle of array (index is n) using a rule:
1. Increment the position if we passed "1" bit and decrement when passed "0" bit
2. When meet already initialized array element - don't change it and remember the difference between positions (current minus taken from array element) - this is a size of local maximum sequence.
3. Every time we meet local maximum compare it with the global maximum and update if the latter is less.
For example: bit sequence is 0,0,0,1,0,1
initial array index is n
set arr[n] = 0 (position)
bit 0 -> index--
set arr[n-1] = 1
bit 0 -> index--
set arr[n-2] = 2
bit 0 -> index--
set arr[n-3] = 3
bit 1 -> index++
arr[n-2] already contains 2 -> thus, local max seq is [3,2] becomes abs. maximum
will not overwrite arr[n-2]
bit 0 -> index--
arr[n-3] already contains 3 -> thus, local max seq is [4,3] is not abs. maximum
bit 1 -> index++
arr[n-2] already contains 2 -> thus, local max seq is [5,2] is abs. max
Thus, we passing through the whole bit array only once.
Does this solves the task?
input:
n - number of bits
a[n] - input bit-array
track_pos[2*n] = {0,};
ind = n;
/* start from position 1 since zero has
meaning track_pos[x] is not initialized */
for (i = 1; i < n+1; i++) {
if (track_pos[ind]) {
seq_size = i - track_pos[ind];
if (glob_seq_size < seq_size) {
/* store as interm. result */
glob_seq_size = seq_size;
glob_pos_from = track_pos[ind];
glob_pos_to = i;
}
} else {
track_pos[ind] = i;
}
if (a[i-1])
ind++;
else
ind--;
}
output:
glob_seq_size - length of maximum sequence
glob_pos_from - start position of max sequence
glob_pos_to - end position of max sequence
In this thread ( http://discuss.techinterview.org/default.asp?interview.11.792102.31 ), poster A.F. has given an algorithm that runs in O(n) time and uses O(sqrt(n log n)) bits.
brute force: start with maximum length of the array to count the o's and l's. if o eqals l, you are finished. else reduce search length by 1 and do the algorithm for all subsequences of the reduced length (that is maximium length minus reduced length) and so on. stop when the subtraction is 0.
As was pointed out by user "R..", there is no solution, strictly speaking, unless you ignore the "log n" space complexity. In the following, I will consider that the array length fits in a machine register (e.g. a 64-bit word) and that a machine register has size O(1).
The important point to notice is that if there are more 1's than 0's, then the maximum subsequence that you are looking for necessarily includes all the 0's, and that many 1's. So here the algorithm:
Notations: the array has length n, indices are counted from 0 to n-1.
First pass: count the number of 1's (c1) and 0's (c0). If c1 = c0 then your maximal subsequence is the entire array (end of algorithm). Otherwise, let d be the digit which appears the less often (d = 0 if c0 < c1, otherwise d = 1).
Compute m = min(c0, c1) * 2. This is the size of the subsequence you are looking for.
Second pass: scan the array to find the index j of the first occurrence of d.
Compute k = max(j, n - m). The subsequence starts at index k and has length m.
Note that there could be several solutions (several subsequences of maximal length which match the criterion).
In plain words: assuming that there are more 1's than 0's, then I consider the smallest subsequence which contains all the 0's. By definition, that subsequence is surrounded by bunches of 1's. So I just grab enough 1's from the sides.
Edit: as was pointed out, this does not work... The "important point" is actually wrong.
Try something like this:
/* bit(n) is a macro that returns the nth bit, 0 or 1. len is number of bits */
int c[2] = {0,0};
int d, i, a, b, p;
for(i=0; i<len; i++) c[bit(i)]++;
d = c[1] < c[0];
if (c[d] == 0) return; /* all bits identical; fail */
for(i=0; bit(i)!=d; i++);
a = b = i;
for(p=0; i<len; i++) {
p += 2*bit(i)-1;
if (!p) b = i;
}
if (a == b) { /* account for case where we need bits before the first d */
b = len - 1;
a -= abs(p);
}
printf("maximal subsequence consists of bits %d through %d\n", a, b);
Completely untested but modulo stupid mistakes it should work. Based on my reply to Thomas's answer which failed in certain cases.
New Solution:
Space complexity of O(1) and time complexity O(n^2)
int iStart = 0, iEnd = 0;
int[] arrInput = { 1, 0, 1, 1, 1,0,0,1,0,1,0,0 };
for (int i = 0; i < arrInput.Length; i++)
{
int iCurrEndIndex = i;
int iSum = 0;
for (int j = i; j < arrInput.Length; j++)
{
iSum = (arrInput[j] == 1) ? iSum+1 : iSum-1;
if (iSum == 0)
{
iCurrEndIndex = j;
}
}
if ((iEnd - iStart) < (iCurrEndIndex - i))
{
iEnd = iCurrEndIndex;
iStart = i;
}
}
I am not sure whether the array you are referring is int array of 0's and 1's or bitarray??
If its about bitarray, here is my approach:
int isEvenBitCount(int n)
{
//n ... //Decimal equivalent of the input binary sequence
int cnt1 = 0, cnt0 = 0;
while(n){
if(n&0x01) { printf("1 "); cnt1++;}
else { printf("0 "); cnt0++; }
n = n>>1;
}
printf("\n");
return cnt0 == cnt1;
}
int main()
{
int i = 40, j = 25, k = 35;
isEvenBitCount(i)?printf("-->Yes\n"):printf("-->No\n");
isEvenBitCount(j)?printf("-->Yes\n"):printf("-->No\n");
isEvenBitCount(k)?printf("-->Yes\n"):printf("-->No\n");
}
with use of bitwise operations the time complexity is almost O(1) also.