ACM-ICPC 2018 焦作赛区网络预赛 F. Modular Production Line (区间K覆盖-最小费用流)

时间:2023-03-09 14:58:55
ACM-ICPC 2018 焦作赛区网络预赛 F. Modular Production Line (区间K覆盖-最小费用流)

很明显的区间K覆盖模型,用费用流求解.只是这题N可达1e5,需要将点离散化.

建模方式步骤:

1.对权值为w的区间[u,v],加边id(u)->id(v+1),容量为1,费用为-w;

2.对所有相邻的点加边id(i)->id(i+1),容量为正无穷,费用为0;

3.建立源点汇点,由源点s向最左侧的点加边,容量为K,费用为0,由最右侧的点向汇点加边,容量为K,费用为0

4.跑出最大流后,最小费用取绝对值就是能获得的最大权

#include<bits/stdc++.h>

using namespace std;

const int MAXN = 1000;

const int MAXM = 100000;

const int INF = 0x3f3f3f3f;

struct Edge{

    int to, next, cap, flow, cost;

} edge[MAXM];

int head[MAXN], tol;

int pre[MAXN], dis[MAXN];

bool vis[MAXN];

int N;

void init(int n)

{

    N = n;

    tol = 0;

    memset(head, -1, sizeof(head));

}

void addedge(int u, int v, int cap, int cost)

{

    edge[tol].to = v;

    edge[tol].cap = cap;

    edge[tol].cost = cost;

    edge[tol].flow = 0;

    edge[tol].next = head[u];

    head[u] = tol++;

    edge[tol].to = u;

    edge[tol].cap = 0;

    edge[tol].cost = -cost;

    edge[tol].flow = 0;

    edge[tol].next = head[v];

    head[v] = tol++;

}

bool spfa(int s, int t){

    queue<int> q;

    for (int i = 0; i < N; i++){

        dis[i] = INF;

        vis[i] = false;

        pre[i] = -1;

    }

    dis[s] = 0;

    vis[s] = true;

    q.push(s);

    while (!q.empty()){

        int u = q.front();

        q.pop();

        vis[u] = false;

        for (int i = head[u]; i != -1; i = edge[i].next){

            int v = edge[i].to;

            if (edge[i].cap > edge[i].flow && dis[v] > dis[u] + edge[i].cost){

                dis[v] = dis[u] + edge[i].cost;

                pre[v] = i;

                if (!vis[v]){

                    vis[v] = true;

                    q.push(v);

                }

            }

        }

    }

    if (pre[t] == -1) return false;

    else  return true;

}

int minCostMaxflow(int s, int t, int &cost){

    int flow = 0;

    cost = 0;

    while (spfa(s, t)){

        int Min = INF;

        for (int i = pre[t]; i != -1; i = pre[edge[i ^ 1].to]){

            if (Min > edge[i].cap - edge[i].flow)

                Min = edge[i].cap - edge[i].flow;

        }

        for (int i = pre[t]; i != -1; i = pre[edge[i ^ 1].to]){

            edge[i].flow += Min;

            edge[i ^ 1].flow -= Min;

            cost += edge[i].cost * Min;

        }

        flow += Min;

    }

    return flow;

}

map<int,int> dp;

struct edg{

    int u,v,w;

}ed[MAXN];

int main()

{

    #ifndef ONLINE_JUDGE

        freopen("in.txt","r",stdin);

        freopen("out.txt","w",stdout);

    #endif

    int T,N,M,K,u,v,w;

    scanf("%d",&T);

    map<int,int> ::iterator it;

    while(T--){

        dp.clear();

        scanf("%d %d %d",&N, &K, &M);

        for(int i=1;i<=M;++i){

            scanf("%d %d %d",&u,&v,&w);

            v++;

            ed[i] = (edg){u,v,w};

            dp[u] = dp[v] = 1;

        }

        int cnt=0;

        for(it = dp.begin();it!=dp.end();++it){

            int id = it->first;

            dp[id] =  ++cnt;

        }

        init(cnt+5);

        int s = 0,t = cnt+1;

        addedge(s,1,K,0);

        addedge(cnt,t,K,0);

        for(int i=1;i<cnt;++i){

            addedge(i,i+1,INF,0);

        }

        for(int i=1;i<=M;++i){

            u = ed[i].u, v = ed[i].v;

            u = dp[u], v =dp[v];

            addedge(u,v,1,-ed[i].w);

        }

        int cost;

        minCostMaxflow(s,t,cost);

        printf("%d\n",-cost);

    }

    return 0;

}