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198. House Robber

Problem statment:

You are a professional robber planning to rob houses along a street. Each house has a certain amount of money stashed, the only constraint stopping you from robbing each of them is that adjacent houses have security system connected and it will automatically contact the police if two adjacent houses were broken into on the same night.

Given a list of non-negative integers representing the amount of money of each house, determine the maximum amount of money you can rob tonight without alerting the police.

Solution one: DP(AC)

In fact, this problem requires the max sum for nonadjacent numbers in an array. The basic idea is dynamic programming.

This is my first solution.

dp[i] is the max sum so far.

DP formula:

dp[i] = max(dp[i - 2] + nums[i], dp[i - 1]); ---> current max sum is the max val between rob current house and not rob.

      rob current house   not rob

Initialization:

since dp[i] depends on dp[i - 2], we need the value of dp[i - 1] and dp[i - 2]. 

For dp[0] = nums[0].

dp[1] = max(nums[0], nums[1]) ---> initially, I set dp[1] = nums[1], that is why I was declined since a wrong test case of [2,1,1,2].

return dp[n].

Time complexity is O(n). Space complexity is O(n).

class Solution {public:    int rob(vector<int>& nums) {        if(nums.empty()){            return 0;        }        if(nums.size() == 1){            return nums[0];        }        if(nums.size() == 2){            return max(nums[0], nums[1]);        }        int size = nums.size();        vector<int> dp(size, 0);        dp[0] = nums[0];        dp[1] = max(nums[0], nums[1]);        for(int i = 2; i < nums.size(); i++){            dp[i] = max(dp[i - 2] + nums[i], dp[i - 1]);        }        return dp.back();    }};

Solution two: DP(AC)

It is also DP philosophy. But we use two dp array.

r[i]: max value if rob current house

n[i]: max value if do not rob current house

DP formula:

r[i] = n[i - 1] + nums[i];

n[i] = max(r[i - 1], n[i - 1]);

Initialization:

r[i] and n[i] only depends on r[i - 1] and n[i - 1], we only initialize r[0] and n[0].

r[0] = nums[0];

n[0] = 0;

Return max(r[n], n[n]);

Time complexity is O(n). Space complexity is O(n).

class Solution {public:    int rob(vector<int>& nums) {        if(nums.empty()){            return 0;        }        int size = nums.size();        vector<int> r(size, 0);        vector<int> n(size, 0);        r[0] = nums[0];        for(int i = 1; i < size; i++){            r[i] = nums[i] + n[i - 1];            n[i] = max(r[i - 1], n[i - 1]);        }        return max(r.back(), n.back());    }};

Solution three:

This is not a new idea, it optimize the solution two.

We can reduce space complexity from O(n) to O(1) since r[i] and n[i] only depend on r[i - 1] and n[i - 1].

class Solution {public:    int rob(vector<int>& nums) {        if(nums.empty()){            return 0;        }        int size = nums.size();        int rob = nums[0], not_rob = 0;        for(int i = 1; i < size; i++){            int r = rob;            int n = not_rob;            rob = nums[i] + n;            not_rob = max(r, n);        }        return max(rob, not_rob);    }};

198. House Robber