[BZOJ 3144][HNOI 2013] 切糕

题目大意

切糕是 (p times q times r) 的长方体，每个点有一个违和感 (v_{x, y, z})。先要水平切开切糕（即对于每个纵轴，切面与其有且只有一个交点），要求水平上相邻两点的切面高度差小于等于 (D)，求切面违和感和的最小值。

(1 leqslant p, ; q, ; r leqslant 40)

(0 leqslant v leqslant 1,000)

题目链接

BZOJ 3144

CodeVS 2997

题解

最小割。

用边连接相邻两个高度的的点，边 ((x, y, z - 1) rightarrow (x, y, z)) 容量为 (v_{x, y, z})，由源点发散出边连接第一层的每个点，最后一层的点收缩在汇点，这是没有(D)的限制是的答案。连接所有形如 ((x, y, z) rightarrow (x, y, z - D)) 的边，这样，当水平相邻的两个点切面差大于 (D) 时，最小割的图会由这样的边连在一起而没有被隔开。

代码


#include <climits>
#include <queue>
#include <algorithm>
const int MAXN = 40;
struct ;
struct Node {
    Edge *e, *curr;
    int level;
} N[MAXN * MAXN * MAXN + 2];
struct  {
    Node *u, *v;
    Edge *next, *rev;
    int cap, flow;
    Edge(Node *u, Node *v, int cap) : u(u), v(v), cap(cap), flow(0), next(u->e) {}
};
void addEdge(int u, int v, int cap) {
    N[u].e = new Edge(&N[u], &N[v], cap);
    N[v].e = new Edge(&N[v], &N[u], 0);
    N[u].e->rev = N[v].e;
    N[v].e->rev = N[u].e;
}
namespace Dinic {
    bool makeLevelGraph(Node *s, Node *t, int n) {
        for (int i = 0; i < n; i++) N[i].level = 0;
        std::queue<Node *> q;
        q.push(s);
        s->level = 1;
        while (!q.empty()) {
            Node *u = q.front();
            q.pop();
            for (Edge *e = u->e; e; e  大专栏  [BZOJ 3144][HNOI 2013] 切糕= e->next) {
                if (e->cap > e->flow && e->v->level == 0) {
                    e->v->level = u->level + 1;
                    if (e->v == t) return true;
                    q.push(e->v);
                }
            }
        }
        return false;
    }
    int findPath(Node *s, Node *t, int limit = INT_MAX) {
        if (s == t) return limit;
        for (Edge *&e = s->curr; e; e = e->next) {
            if (e->cap > e->flow && e->v->level == s->level + 1) {
                int flow = findPath(e->v, t, std::min(limit, e->cap - e->flow));
                if (flow > 0) {
                    e->flow += flow;
                    e->rev->flow -= flow;
                    return flow;
                }
            }
        }
        return 0;
    }
    int solve(int s, int t, int n) {
        int res = 0;
        while (makeLevelGraph(&N[s], &N[t], n)) {
            for (int i = 0; i < n; i++) N[i].curr = N[i].e;
            int flow;
            while ((flow = findPath(&N[s], &N[t])) > 0) res += flow;
        }
        return res;
    }
}
int p, q, r;
int getID(int x, int y, int z) {
    if (z == 0) return 0;
    return (z - 1) * p * q + (x - 1) * q + y;
}
bool valid(int x, int y) {
    return (x > 0) && (y > 0) && (x <= p) && (y <= q);
}
int main() {
    int D;
    scanf("%d %d %d %d", &p, &q, &r, &D);
    static int v[MAXN + 1][MAXN + 1][MAXN + 1];
    for (int k = 1; k <= r; k++) for (int i = 1; i <= p; i++) for (int j = 1; j <= q; j++) scanf("%d", &v[i][j][k]);
    const int s = 0, t = p * q * r + 1;
    const int d[4][2] = {
        {0, 1},
        {0, -1},
        {1, 0},
        {-1, 0}
    };
    for (int i = 1; i <= p; i++) for (int j = 1; j <= q; j++) {
        for (int k = 1; k <= r; k++) {
            addEdge(getID(i, j, k - 1), getID(i, j, k), v[i][j][k]);
            if (k > D) for (int l = 0; l < 4; l++) {
                int x = i + d[l][0], y = j + d[l][1];
                if (valid(x, y)) addEdge(getID(i, j, k), getID(x, y, k - D), INT_MAX);
            }
        }
        addEdge(getID(i, j, r), t, INT_MAX);
    }
    printf("%dn", Dinic::solve(s, t, t + 1));
    return 0;
}

[BZOJ 3144][HNOI 2013] 切糕

题目大意

题目链接

题解

代码

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