题目:

Given a non negative integer number num. For every numbers i in the range 0 ≤ i ≤ num calculate the number of 1’s in their binary representation and return them as an array.

Example:

For num = 5 you should return [0,1,1,2,1,2].

Follow up:

It is very easy to come up with a solution with run time O(n*sizeof(integer)). But can you do it in linear time O(n) /possibly in a single pass?

Space complexity should be O(n).

Can you do it like a boss? Do it without using any builtin function like __builtin_popcount in c++ or in any other language.

Hint:

You should make use of what you have produced already.

翻译:

给定一个非负整数num,对于每一个0<=i<=num的整数i。计算i的二进制表示中1的个数,返回这些个数作为一个数组。

比如。输入num = 5 你应该返回 [0,1,1,2,1,2].

分析:

依照常规思路,非常容易得出“Java代码2”的方案。可是这个方法的时间复杂度是O(nlogn)。

通过对数组的前64个元素进行分析(num=63),我们发现数组呈现一定的规律,不断重复。例如以下图所看到的:

0

1

1 2

1 2 2 3

1 2 2 3 2 3 3 4

1 2 2 3 2 3 3 4 2 3 3 4 3 4 4 5

1 2 2 3 2 3 3 4 2 3 3 4 3 4 4 5 2 3 3 4 3 4 4 5 3 4 4 5 4 5 5 6

由此我们发现0112是一个基础元素。不断循环重复。能够推论:假设已知第一个元素是result[0],那么第二第三个元素为result[0]+1,第四个元素为result[0]+2,由此获得前4个元素result[0]~result[3]。以这4个元素为基础。我们能够得到

result[4]=result[0]+1,result[5]=result[1]+1…。

result[8]=result[0]+1,result[9]=result[1]+1… ,

result[12]=result[0]+2,result[13]=result[1]+2…;

以此类推能够获得所有的数组。

Java版代码1:

public class Solution {

public int[] countBits(int num) {

int[] result = new int[num + 1];

int range = 1;

result[0] = 0;

boolean stop = false;

while (!stop) {

stop = fillNum(result, range);

range *= 4;

}

return result;

}

public boolean fillNum(int[] nums, int range) {

for (int i = 0; i < range; i++) {

if (range + i < nums.length) {

nums[range + i] = nums[i] + 1;

} else {

return true;

}

if (2 * range + i < nums.length) {

nums[2 * range + i] = nums[i] + 1;

}

if (3 * range + i < nums.length) {

nums[3 * range + i] = nums[i] + 2;

}

}

return false;

}

}

Java版代码2:

public class Solution {

public int[] countBits(int num) {

int[] result=new int[num+1];

result[0]=0;

for(int i=1;i<=num;i++){

result[i]=getCount(i);

}

return result;

}

public int getCount(int num){

int count=0;

while(num!=0){

if((num&1)==1){

count++;

}

num/=2;

}

return count;

}

}

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