题目
给定序列A,序列中的每一项Ai有删除代价Bi和附加属性Ci。请删除若
干项,使得4的最长上升子序列长度减少至少1,且付出的代价之和最小,并输出方案。
如果有多种方案,请输出将删去项的附加属性排序之后,字典序最小的一种。
输入格式
输入包含多组数据。
输入的第一行包含整数T,表示数据组数。接下来4*T行描述每组数据。
每组数据的第一行包含一个整数N,表示A的项数,接下来三行,每行N个整数A1..An,B1.,Bn,C1..Cn,满足1 < =Ai,Bi,Ci < =10^9,且Ci两两不同。
输出格式
对每组数据,输出两行。第一行包含两个整数S,M,依次表示删去项的代价和与数量;接下来一行M个整数,表示删去项在4中的的位置,按升序输出。
输入样例
1
6
3 4 4 2 2 3
2 1 1 1 1 2
6 5 4 3 2 1
输出样例
4 3
2 3 6
解释:删去(A2,43,A6),(A1,A6),(A2,43,44,A5)等都是合法的方案,但
{A2,43,A6)对应的C值的字典序最小。
提示
1 < =N < =700 T < =5
题解
被卡常了,,,
求LIS还是得二分
首先,由经典建模,我们可以求出问题的答案
每个点拆点,代价为权值,然后S向LIS为1的点连边,LIS最大的向T连边
最难的是求方案
割的判定:
对于边(u,v)如果残量网络中不存在任何一条从u到v的增广路,说明(u,v)为割
我们按C从小到大枚举点,如果为割则加入答案
然后要删掉(u,v)这条边,防止对其它点判定的影响
先撤回流量,再置容量为0
撤回流量:
跑一遍T到v的最大流,再跑一遍u到S的最大流
然后就可以A了 才怪,小心卡常
#include<iostream>
#include<cstdio>
#include<cmath>
#include<queue>
#include<cstring>
#include<algorithm>
#define LL long long int
#define Redge(u) for (int k = h[u],to; k; k = ed[k].nxt)
#define REP(i,n) for (int i = 1; i <= (n); i++)
#define BUG(s,n) for (int i = 1; i <= (n); i++) cout<<s[i]<<' '; puts("");
#define cls(x) memset(x,0,sizeof(x))
using namespace std;
const int maxn = 1405,maxm = 2000005;
const LL INF = 10000000000000000ll;
inline int read(){
int out = 0,flag = 1; char c = getchar();
while (c < 48 || c > 57){if (c == '-') flag = -1; c = getchar();}
while (c >= 48 && c <= 57){out = (out << 3) + (out << 1) + c - 48; c = getchar();}
return out * flag;
}
int h[maxn],ne = 2;
struct EDGE{int to,nxt; LL f;}ed[maxm];
inline void build(int u,int v,LL f){
ed[ne] = (EDGE){v,h[u],f}; h[u] = ne++;
ed[ne] = (EDGE){u,h[v],0}; h[v] = ne++;
}
int n,A[maxn],B[maxn],C[maxn],id[maxn],m;
LL vis[maxn],d[maxn];
int S,T,oute[maxn],cur[maxn];
inline bool cmp(const int& a,const int& b){
return C[a] < C[b];
}
int f[maxn],bac[maxn];
int find(int x){
int l = 0,r = n,mid;
while (l < r){
mid = l + r + 1 >> 1;
if (bac[mid] < x) l = mid;
else r = mid - 1;
}
return l;
}
void init(){
ne = 2;
n = read(); m = (n << 1 | 1);
for (int i = 0; i <= m; i++) h[i] = 0,bac[i] = INF;
REP(i,n) A[i] = read();
REP(i,n) B[i] = read();
REP(i,n) C[i] = read(),id[i] = i;
sort(id + 1,id + 1 + n,cmp);
S = 0; T = 2 * n + 1;
for (int i = 1; i <= n; i++){
f[i] = max(1,find(A[i]) + 1);
bac[f[i]] = min(bac[f[i]],A[i]);
}
int ans = 0;
for (int i = 1; i <= n; i++) ans = max(ans,f[i]);
for (int i = 1; i <= n; i++){
if (f[i] == 1) build(S,i,INF);
else if (f[i] == ans) build(i + n,T,INF);
oute[i] = ne;
build(i,i + n,B[i]);
for (int j = i + 1; j <= n; j++)
if (f[j] == f[i] + 1 && A[i] < A[j])
build(i + n,j,INF);
}
}
int q[2 * maxn],head,tail;
bool bfs(){
for (int i = 0; i <= m; i++) d[i] = -1;
q[head = tail = 1] = S;
d[S] = 1;
int u;
while (head <= tail){
u = q[head++];
Redge(u) if (ed[k].f && d[to = ed[k].to] == -1){
d[to] = d[u] + 1;
q[++tail] = to;
if (to == T) return true;
}
}
return false;
}
LL dfs(int u,LL minf){
if (u == T || !minf) return minf;
LL flow = 0,f; int to;
if (cur[u] == -1) cur[u] = h[u];
for (int& k = cur[u]; k; k = ed[k].nxt)
if (d[to = ed[k].to] == d[u] + 1 && (f = dfs(to,min(minf,ed[k].f)))){
ed[k].f -= f; ed[k ^ 1].f += f;
minf -= f; flow += f;
if (!minf) break;
}
return flow;
}
LL maxflow(){
LL flow = 0;
while (bfs()){
for (int i = 0; i <= m; i++) cur[i] = -1;
flow += dfs(S,INF);
}
return flow;
}
int ans[maxn],ansi;
void solve(){
printf("%lld ",maxflow());
ansi = 0;
for (int i = 1; i <= n; i++){
int u = id[i];
if (!ed[oute[u]].f){
S = u; T = u + n;
if (bfs()) continue;
ans[++ansi] = u;
S = 2 * n + 1; T = u + n;
maxflow();
S = u; T = 0;
maxflow();
ed[oute[u]].f = ed[oute[u] ^ 1].f = 0;
}
}
printf("%d
",ansi);
if (ansi){
sort(ans + 1,ans + 1 + ansi);
printf("%d",ans[1]);
for (int i = 2; i <= ansi; i++)
printf(" %d",ans[i]);
puts("");
}
}
int main(){
int t = read();
while (t--){
init();
solve();
}
return 0;
}