結果

問題 No.1301 Strange Graph Shortest Path
ユーザー zkouzkou
提出日時 2020-11-07 10:42:03
言語 PyPy3
(7.3.15)
結果
TLE  
実行時間 -
コード長 4,690 bytes
コンパイル時間 376 ms
コンパイル使用メモリ 82,564 KB
実行使用メモリ 459,096 KB
最終ジャッジ日時 2024-09-13 00:40:40
合計ジャッジ時間 84,532 ms
ジャッジサーバーID
(参考情報)
judge2 / judge3
このコードへのチャレンジ
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テストケース

テストケース表示
入力 結果 実行時間
実行使用メモリ
testcase_00 AC 40 ms
55,176 KB
testcase_01 AC 40 ms
53,828 KB
testcase_02 TLE -
testcase_03 AC 2,679 ms
391,896 KB
testcase_04 WA -
testcase_05 AC 2,962 ms
440,340 KB
testcase_06 WA -
testcase_07 TLE -
testcase_08 AC 2,864 ms
399,900 KB
testcase_09 AC 2,655 ms
398,904 KB
testcase_10 AC 2,609 ms
395,416 KB
testcase_11 WA -
testcase_12 TLE -
testcase_13 AC 2,870 ms
440,340 KB
testcase_14 WA -
testcase_15 AC 2,584 ms
402,400 KB
testcase_16 WA -
testcase_17 TLE -
testcase_18 TLE -
testcase_19 AC 2,626 ms
405,808 KB
testcase_20 WA -
testcase_21 TLE -
testcase_22 WA -
testcase_23 AC 2,820 ms
438,080 KB
testcase_24 WA -
testcase_25 TLE -
testcase_26 TLE -
testcase_27 AC 2,680 ms
409,944 KB
testcase_28 AC 2,751 ms
418,284 KB
testcase_29 WA -
testcase_30 WA -
testcase_31 WA -
testcase_32 AC 41 ms
53,856 KB
testcase_33 AC 2,036 ms
437,508 KB
testcase_34 AC 2,630 ms
439,976 KB
権限があれば一括ダウンロードができます

ソースコード

diff #

import sys
import heapq

input = sys.stdin.readline

class mcf_graph_int_cost:
    """
    頂点数、及び、costの総和が、4294967295 (== (1 << 32) - 1) を超えない前提下での高速な実装。
    後者は超えても一応動く。
    """

    def __init__(self, n):
        self.n = n
        self.pos = []
        self.g = [[] for _ in range(n)]


    def add_edge(self, from_, to, cap, cost):
        # assert 0 <= from_ < self.n
        # assert 0 <= to < self.n
        m = len(self.pos)
        self.pos.append((from_, len(self.g[from_])))
        self.g[from_].append(self.__class__._edge(to, len(self.g[to]), cap, cost))
        self.g[to].append(self.__class__._edge(from_, len(self.g[from_]) - 1, 0, -cost))
        return m


    class edge:
        def __init__(self, from_, to, cap, flow, cost):
            self.from_ = from_
            self.to = to
            self.cap = cap
            self.flow = flow
            self.cost = cost


    def get_edge(self, i):
        _e = self.g[self.pos[i][0]][self.pos[i][1]]
        _re = self.g[_e.to][_e.rev]
        return self.__class__.edge(self.pos[i][0], _e.to, _e.cap + _re.cap, _re.cap, _e.cost)


    def edges(self):
        ret = []
        for i in range(len(self.pos)):
            _e = self.g[self.pos[i][0]][self.pos[i][1]]
            _re = self.g[_e.to][_e.rev]
            ret.append(self.__class__.edge(self.pos[i][0], _e.to, _e.cap + _re.cap, _re.cap, _e.cost))
        return ret


    def _dual_ref(self, s, t):
        self.dist = [4294967295] * self.n
        self.pv = [-1] * self.n
        self.pe = [-1] * self.n
        self.vis = [False] * self.n

        que = [s] # s ==  (0 << 32) + s 
        self.dist[s] = 0
        while que:
            v = heapq.heappop(que) & 4294967295
            if self.vis[v]:
                continue
            self.vis[v] = True
            if v == t:
                break
            for i in range(len(self.g[v])):
                e = self.g[v][i]
                if self.vis[e.to] or e.cap == 0:
                    continue
                cost = e.cost - self.dual[e.to] + self.dual[v]
                if self.dist[e.to] > self.dist[v] + cost:
                    self.dist[e.to] = self.dist[v] + cost
                    self.pv[e.to] = v
                    self.pe[e.to] = i
                    heapq.heappush(que, ((self.dist[e.to] << 32) + e.to))
        if not self.vis[t]:
            return False

        for v in range(self.n):
            if not self.vis[v]:
                continue
            self.dual[v] -= self.dist[t] - self.dist[v]
        
        return True


    def slope(self, s, t, flow_limit=4294967295):
        # assert 0 <= s < self.n
        # assert 0 <= t < self.n
        # assert s != t
        
        self.dual = [0] * self.n
        self.dist = [4294967295] * self.n
        self.pv = [-1] * self.n
        self.pe = [-1] * self.n
        self.vis = [False] * self.n
        
        flow = 0
        cost = 0
        prev_cost = -1
        result = [(flow, cost)]
        while flow < flow_limit:
            if not self._dual_ref(s, t):
                break
            c = flow_limit - flow
            v = t
            while v != s:
                c = min(c, self.g[self.pv[v]][self.pe[v]].cap)
                v = self.pv[v]
            v = t
            while v != s:
                e = self.g[self.pv[v]][self.pe[v]]
                e.cap -= c
                self.g[v][e.rev].cap += c
                v = self.pv[v]
            d = -self.dual[s]
            flow += c
            cost += c * d
            if prev_cost == d:
                result.pop()
            result.append((flow, cost))
            prev_cost = cost
        return result


    def flow(self, s, t, flow_limit=4294967295):
        return self.slope(s, t, flow_limit)[-1]

    
    class _edge:
        def __init__(self, to, rev, cap, cost):
            self.to = to
            self.rev = rev
            self.cap = cap
            self.cost = cost


N, M = map(int, input().split())

g = mcf_graph_int_cost(N + 4 * M)

for i in range(M):
    u, v, c, d = map(int, input().split())
    u -= 1
    v -= 1
    # コスト c の、一回しか通れない無向辺
    u2 = N + i
    v2 = N + M + i
    g.add_edge(u, u2, 1, 0)
    g.add_edge(v, u2, 1, 0)
    g.add_edge(u2, v2, 1, c)
    g.add_edge(v2, u, 1, 0)
    g.add_edge(v2, v, 1, 0)
    # コスト d の、一回しか通れない無向辺
    u3 = N + 2 * M + i
    v3 = N + 3 * M + i
    g.add_edge(u, u3, 1, 0)
    g.add_edge(v, u3, 1, 0)
    g.add_edge(u3, v3, 1, d)
    g.add_edge(v3, u, 1, 0)
    g.add_edge(v3, v, 1, 0)

print(g.flow(0, N - 1, 2)[1])
    
0