题解:
第一题把点拆了,dis[i][j]表示当前在i点经过了j个城市的最小距离,然后建一个大的S,T,跑一遍SPFA就可以了,dijstra巨慢;
#include<bits/stdc++.h> using namespace std; const int M = 2005, ME = 1e5; const int inf = 2e9; int h[M], s[M], t[M], d[M][M], a[M], b[M], S, T, tot, inq[M][M]; struct sta{ int x, v, dis; bool operator < (const sta &rhs) const{ return v == rhs.v ? dis > rhs.dis : v > rhs.v; } }; struct edge{int nxt, v, w;}G[ME]; void add(int u, int v, int w){ G[++tot].v = v; G[tot].nxt = h[u]; G[tot].w = w; h[u] = tot; } queue <sta> q; int main(){ freopen("park.in","r",stdin); freopen("park.out","w",stdout); int V, M, N, E, L; scanf("%d%d%d%d%d", &V, &M, &N, &E, &L); S = 0, T = V + 1; for(int i = 1; i <= M; i++){ scanf("%d%d", &s[i], &a[i]); add(S, s[i], a[i]); } for(int i = 1; i <= N; i++){ scanf("%d%d", &t[i], &b[i]); add(t[i], T, b[i]); } for(int i = 1; i <= E; i++){ int u, v, w; scanf("%d%d%d", &u, &v, &w); add(u, v, w); } for(int i = 0; i <= T; i++) for(int j = 0; j <= T; j++) d[i][j] = inf; int ts = 0; q.push((sta){S, 0});inq[S][0] = 1; d[S][0] = 0; while(!q.empty()){ sta u = q.front(); q.pop(); inq[u.x][u.v] = 0; for(int i = h[u.x]; i; i = G[i].nxt){ if(d[G[i].v][u.v + 1] > d[u.x][u.v] + G[i].w && d[u.x][u.v] + G[i].w <= L){ d[G[i].v][u.v + 1] = d[u.x][u.v] + G[i].w; if(!inq[G[i].v][u.v + 1])inq[G[i].v][u.v + 1] = 1, q.push((sta){G[i].v, u.v + 1}); } } } for(int i = T; i; i--)if(d[T][i] <= L){ts = i;break;} //int vv=clock(); //cout<<cc-tt<<" "<<vv-cc<<endl; printf("%d\n", max(0, ts - 1)); }
第二题:处理出当前点向右延展第一次可以到那pos[i],那么他随便向右延展都可以;
所以对于一个查询我们二分找到pos[i]<=rg的最大lf,那么他前面的点都可以;
贡献就是sum( posi - i + R - i) * (R - posi +1) / 2 - i * (R - posi + 1) * i;
把式子拆了就成了 1/2 * ( sum(R*R + R + 2i * (r + 1) ) + sum(posi - posi*posi+ 2*i*posi) )
前面是常数,后面用前缀和维护;
#include<bits/stdc++.h> using namespace std; #define ll long long const int M = 1e6 + 10; int tmp, cnt, a[M], vis[M], n; void add(int c, int d){ vis[c]+=d; if(vis[c] == 1 && d > 0)tmp++; if(!vis[c] && d < 0)tmp--; } ll sum[M], gx[M], pos[M]; ll binary(ll lf, ll rg, ll k){ ll ans = 0; while(lf <= rg){ ll mid = (lf + rg) >> 1; if(pos[mid] <= k)ans = mid, lf = mid + 1; else rg = mid - 1; } return ans; } int main(){ freopen("plan.in","r",stdin); freopen("plan.out","w",stdout); int m, q; scanf("%d%d%d", &n, &m, &q); for(int i = 1; i <= n; i++)scanf("%d", a + i); int s, t = 0; for(s = 1; s <= n;){ while(tmp < m && t <= n)add(a[++t], 1); if(t > n)break; pos[s] = t; add(a[s], -1);s++; } for(; s <= n; s++)pos[s] = n + 1; for(int i = 1; i <= n; i++){ gx[i] = pos[i] - pos[i]*pos[i] + 2*i*1LL*pos[i]; sum[i] = sum[i - 1] + gx[i]; } while(q--){ ll l, r; scanf("%I64d%I64d", &l, &r); ll k = binary(l, r, r); if(!k){ printf("0\n");continue; } ll r1 = 1LL*(k - l + 1) * (r*r + r); ll r2 = -1LL*(r + 1) * (l + k) * (k - l + 1); ll ans = sum[k] - sum[l - 1] + r1 + r2; printf("%I64d\n",ans/2); } }
第三题:期望+状压,我反正是搞不定的,就直接贴std好了
#define FIO "card" #include <cstdio> #define N_MAX 9 #define M_MAX 64 #define S_MAX (1 << (N_MAX << 1)) typedef unsigned long long lnt; typedef unsigned unt; const unt P = 2000000011; inline lnt moc(lnt a) { return a < P ? a : a - P; } inline lnt qow(lnt a, unt k) { static lnt w; for (w = 1; k; a = a * a % P, k >>= 1) if (k & 1) w = w * a % P; return w; } inline lnt inv(lnt a) { return qow(a, P - 2); } const lnt a3[4] = {0, inv(3), moc(2 * inv(3)), 1}; int n, m, i, k, s; struct dat { lnt a, b; } e[M_MAX + 1]; lnt u, v, p[N_MAX + 1], q[N_MAX + 1], r[N_MAX + 1], f[S_MAX + 1][M_MAX + 1]; int main() { freopen(FIO ".in", "r", stdin); freopen(FIO ".out", "w", stdout); scanf("%d %d", &n, &m); v = inv(100 * n); p[n] = 1; for (i = 0; i < n; ++i) scanf("%d", &k), p[i] = k * v % P, p[n] = moc(p[n] - p[i] + P); q[n] = 1; for (i = 0; i < n; ++i) scanf("%d", &k), q[i] = k * v % P, q[n] = moc(q[n] - q[i] + P); for (s = (1 << (n << 1)) - 2; s >= 0; --s) { e[m] = (dat) {1, 0}; u = q[n], v = 0; for (i = 0; i < n; ++i) { u = moc(u + q[i] * a3[s >> (i << 1) & 3] % P); if ((s >> (i << 1) & 3) < 3) v = (v + q[i] * a3[(s >> (i << 1) & 3) ^ 3] % P * f[s + (1 << (i << 1))][m]) % P; } e[m - 1] = (dat) {u * e[m].a % P, (u * e[m].b + v) % P}; u = p[n]; for (i = 0; i < n; ++i) { u = (u + p[i] * a3[s >> (i << 1) & 3]) % P; if ((s >> (i << 1) & 3) < 3) r[i] = p[i] * a3[(s >> (i << 1) & 3) ^ 3] % P; } for (k = m - 2; k >= 0; --k) { v = 0; for (i = 0; i < n; ++i) if ((s >> (i << 1) & 3) < 3) v = (v + r[i] * f[s + (1 << (i << 1))][k + 1]) % P; e[k] = (dat) {u * e[k + 1].a % P, (u * e[k + 1].b + v) % P}; } f[s][0] = inv(moc(1 - e[0].a + P)) * (e[0].a + e[0].b) % P; f[s][m] = moc(f[s][0] + 1); for (k = 1; k < m; ++k) f[s][k] = (e[k].a * f[s][m] + e[k].b) % P; } printf("%d\n", int(f[0][m])); return 0; }