Last stone weight II¶
Time: O(2^N); Space: O(2^N); medium
We have a collection of rocks, each rock has a positive integer weight.
Each turn, we choose any two rocks and smash them together. Suppose the stones have weights x and y with x <= y. The result of this smash is:
If x == y, both stones are totally destroyed;
If x != y, the stone of weight x is totally destroyed, and the stone of weight y has new weight y-x.
At the end, there is at most 1 stone left. Return the smallest possible weight of this stone (the weight is 0 if there are no stones left.)
Example 1:
Input: stones = [2,7,4,1,8,1]
Output: 1
Explanation:
We can combine 2 and 4 to get 2 so the array converts to [2,7,1,8,1] then,
we can combine 7 and 8 to get 1 so the array converts to [2,1,1,1] then,
we can combine 2 and 1 to get 1 so the array converts to [1,1,1] then,
we can combine 1 and 1 to get 0 so the array converts to [1] then that’s the optimal value.
Constraints:
1 <= len(stones) <= 30
1 <= stones[i] <= 100
Hints:
Think of the final answer as a sum of weights with + or - sign symbols infront of each weight. Actually, all sums with 1 of each sign symbol are possible.
Use dynamic programming: for every possible sum with N stones, those sums +x or -x is possible with N+1 stones, where x is the value of the newest stone. (This overcounts sums that are all positive or all negative, but those don’t matter.)
1. Dynamic programming [O(2^N), O(2^N)]¶
[1]:
class Solution1(object):
"""
Time: O(2^N)
Space: O(2^N)
"""
def lastStoneWeightII(self, stones):
"""
:type stones: List[int]
:rtype: int
"""
dp = {0}
for stone in stones:
dp |= {stone+i for i in dp}
S = sum(stones)
return min(abs(i-(S-i)) for i in dp)
[2]:
s = Solution1()
stones = [2,7,4,1,8,1]
assert s.lastStoneWeightII(stones) == 1