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maximum-and-sum-of-array.py
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maximum-and-sum-of-array.py
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# Time: O(n^3)
# Space: O(n^2)
# weighted bipartite matching solution
class Solution(object):
def maximumANDSum(self, nums, numSlots):
"""
:type nums: List[int]
:type numSlots: int
:rtype: int
"""
# Template translated from:
# https://github.com/kth-competitive-programming/kactl/blob/main/content/graph/WeightedMatching.h
def hungarian(a): # Time: O(n^2 * m), Space: O(n + m)
if not a:
return 0, []
n, m = len(a)+1, len(a[0])+1
u, v, p, ans = [0]*n, [0]*m, [0]*m, [0]*(n-1)
for i in xrange(1, n):
p[0] = i
j0 = 0 # add "dummy" worker 0
dist, pre = [float("inf")]*m, [-1]*m
done = [False]*(m+1)
while True: # dijkstra
done[j0] = True
i0, j1, delta = p[j0], None, float("inf")
for j in xrange(1, m):
if done[j]:
continue
cur = a[i0-1][j-1]-u[i0]-v[j]
if cur < dist[j]:
dist[j], pre[j] = cur, j0
if dist[j] < delta:
delta, j1 = dist[j], j
for j in xrange(m):
if done[j]:
u[p[j]] += delta
v[j] -= delta
else:
dist[j] -= delta
j0 = j1
if not p[j0]:
break
while j0: # update alternating path
j1 = pre[j0]
p[j0], j0 = p[j1], j1
for j in xrange(1, m):
if p[j]:
ans[p[j]-1] = j-1
return -v[0], ans # min cost
return -hungarian([[-((nums[i] if i < len(nums) else 0) & (1+x//2)) for x in xrange(2*numSlots)] for i in xrange(2*numSlots)])[0]
# Time: O(n^3)
# Space: O(n^2)
from scipy.optimize import linear_sum_assignment as hungarian
import itertools
# 3rd-party weighted bipartite matching solution
class Solution2(object):
def maximumANDSum(self, nums, numSlots):
"""
:type nums: List[int]
:type numSlots: int
:rtype: int
"""
adj = [[-((nums[i] if i < len(nums) else 0) & (1+x//2)) for x in xrange(2*numSlots)] for i in xrange(2*numSlots)]
return -sum(adj[i][j] for i, j in itertools.izip(*hungarian(adj)))
# Time: O(n * 3^n)
# Space: O(3^n)
# bottom-up dp (hard to implement but faster)
class Solution3(object):
def maximumANDSum(self, nums, numSlots):
"""
:type nums: List[int]
:type numSlots: int
:rtype: int
"""
def count(x):
result = 0
while x:
result += x%3
x //= 3
return result
dp = [0]*(3**numSlots)
for mask in xrange(1, len(dp)):
i = count(mask)-1
x = nums[i] if i < len(nums) else 0
base = 1
for slot in xrange(1, numSlots+1):
if mask//base%3:
dp[mask] = max(dp[mask], (x&slot)+dp[mask-base])
base *= 3
return dp[-1]
# Time: O(n * 3^n)
# Space: O(3^n)
# memoization, top-down dp (easy to implement but slower)
class Solution4(object):
def maximumANDSum(self, nums, numSlots):
"""
:type nums: List[int]
:type numSlots: int
:rtype: int
"""
def memoiztion(i, mask): # i is metadata, which could be derived from mask, just for shorter implementation
if lookup[mask] != -1:
return lookup[mask]
x = nums[i] if i < len(nums) else 0
base = 1
for slot in xrange(1, numSlots+1):
if mask//base%3:
lookup[mask] = max(lookup[mask], (x&slot)+memoiztion(i-1, mask-base))
base *= 3
return lookup[mask]
lookup = [-1]*(3**numSlots)
lookup[0] = 0
return memoiztion(2*numSlots-1, 3**numSlots-1)