• [NOIP 2015] 运输计划


    [题目链接]

             https://www.lydsy.com/JudgeOnline/problem.php?id=4326

    [算法]

            首先,此题的答案是具有单调性的,因此可以二分答案mid

            检验答案时,我们判断每条路径的长度是否大于mid,若大于mid,则说明至少要将这条路径上的一条边变为“虫洞” 

            因此,我们可以对所有长度大于mid的路径做树上差分,若一条边差分后的值 = 大于mid的路径总数,那么判断最长路径 -  这条边的长度 <= mid 

            时间复杂度 : O(N log LEN)( LEN为每条边的长度之和 )

    [代码]

            此份代码在BZOJ上通过了所有测试点,但在UOJ上由于常数原因只能拿到95分 , 此题需要一些常数优化
            

    #include<bits/stdc++.h>
    using namespace std;
    #define MAXN 300010
    #define MAXLOG 18
    
    struct edge
    {
            int to,w,nxt;
    } e[MAXN << 1];
    
    int i,n,m,tot,l,r,mid,ans,cnt,maxlen,num;
    int u[MAXN],v[MAXN],a[MAXN],b[MAXN],t[MAXN],head[MAXN],depth[MAXN],sum[MAXN],s[MAXN],len[MAXN],dis[MAXN];
    int anc[MAXN][MAXLOG];
    
    namespace IO
    {
        template <typename T> inline void read(T &x)
        {
            int f = 1; x = 0;
            char c = getchar();
            for (; !isdigit(c); c = getchar())
            {
                if (c == '-') f = -f;
            }
            for (; isdigit(c); c = getchar()) x = (x << 3) + (x << 1) + c - '0';
            x *= f;
        }
        template <typename T> inline void write(T x)
        {
            if (x < 0)
            {
                putchar('-');
                x = -x;
            }
            if (x > 9) write(x / 10);
            putchar(x % 10 + '0');
        }
        template <typename T> inline void writeln(T x)
        {
            write(x);
            puts("");
        }
    } ;
    inline void addedge(int u,int v,int w)
    {
            tot++;
            e[tot] = (edge){v,w,head[u]};
            head[u] = tot;
    }
    inline void dfs(int u)
    {
            int i,v,w;
            for (i = 1; i < MAXLOG; i++)
            {
                    if (depth[u] < (1 << i)) break;
                    anc[u][i] = anc[anc[u][i - 1]][i - 1];
            }
            for (i = head[u]; i; i = e[i].nxt)
            {
                    v = e[i].to;
                    w = e[i].w;
                    if (v != anc[u][0])
                    {
                            len[v] = w;
                            anc[v][0] = u;
                            depth[v] = depth[u] + 1;
                            sum[v] = sum[u] + w;
                            dfs(v);
                    }
            }
    }
    inline void calc(int u)
    {
            int i,v;
            for (i = head[u]; i; i = e[i].nxt)
            {
                    v = e[i].to;
                    if (v != anc[u][0]) 
                    {
                            calc(v);
                            s[u] += s[v];
                    } 
            }
            if (s[u] == num && len[u] > maxlen) maxlen = len[u];
    }
    inline int lca(int x,int y)
    {
            int i,t;
            if (depth[x] > depth[y]) swap(x,y);
            t = depth[y] - depth[x];
            for (i = 0; i < MAXLOG; i++)
            {
                    if (t & (1 << i))
                            y = anc[y][i];        
            }        
            if (x == y) return x;
            for (i = MAXLOG - 1; i >= 0; i--)
            {
                    if (anc[x][i] != anc[y][i])
                    {
                            x = anc[x][i];
                            y = anc[y][i];
                    }
            }
            return anc[x][0];
    }
    inline int dist(int x,int y)
    {
            return sum[x] + sum[y] - 2 * sum[lca(x,y)];
    }
    inline bool check(int mid)
    {
            int i,j,p,q,w,mx = 0;
            num = 0;
            for (i = 1; i <= n; i++) s[i] = 0;
            for (i = 1; i <= m; i++)
            {
                    if (dis[i] > mid)
                    {
                            mx = max(mx,dis[i]);
                            num++;
                            s[u[i]]++; s[v[i]]++;
                            s[lca(u[i],v[i])] -= 2;
                    }
            }
            if (cnt == 0) return true;
            maxlen = 0;
            calc(1);
            return mx - maxlen <= mid;
    }
        
    int main() 
    {
            
            IO :: read(n); IO :: read(m);
            for (i = 1; i < n; i++)
            {
                    IO :: read(a[i]); IO :: read(b[i]); IO :: read(t[i]);
                    addedge(a[i],b[i],t[i]);
                    addedge(b[i],a[i],t[i]);    
                    cnt += t[i];    
            }
            dfs(1); 
            for (i = 1; i <= m; i++) 
            {
                    IO :: read(u[i]); 
                    IO :: read(v[i]);
                    dis[i] = dist(u[i],v[i]);
            }
            l = 0; r = cnt;
            while (l <= r)
            {
                    mid = (l + r) >> 1;
                    if (check(mid))
                    {
                            r = mid - 1;
                            ans = mid;
                    } else l = mid + 1;
            }
            IO :: writeln(ans);
            
            return 0;
        
    }
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  • 原文地址:https://www.cnblogs.com/evenbao/p/9471590.html
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