#include using namespace std; template< typename CapType, typename CostType > class MinCostFlowDAG { public: using Cat = CapType; using Cot = CostType; using pti = pair< Cot, int >; struct edge { int to, rev; Cat cap; Cot cost; }; const int V; const Cot inf; vector< vector< edge > > G; vector< Cot > h, dist; vector< int > deg, ord, prevv, preve; MinCostFlowDAG(const int node_size) : V(node_size), inf(numeric_limits< Cot >::max()), G(V), h(V, inf), dist(V), deg(V, 0), prevv(V), preve(V) {} void add_edge(const int from, const int to, const Cat cap, const Cot cost) { if(cap == 0) return; G[from].push_back((edge) {to, (int) G[to].size(), cap, cost}); G[to].push_back((edge) {from, (int) G[from].size() - 1, 0, -cost}); ++deg[to]; } bool tsort() { queue< int > que; for(int i = 0; i < V; ++i) { if(deg[i] == 0) que.push(i); } while(!que.empty()) { const int p = que.front(); que.pop(); ord.push_back(p); for(auto &e : G[p]) { if(e.cap > 0 && --deg[e.to] == 0) que.push(e.to); } } return (*max_element(deg.begin(), deg.end()) == 0); } void calc_potential(const int s) { h[s] = 0; for(const int v : ord) { if(h[v] == inf) continue; for(const edge &e : G[v]) { if(e.cap > 0) h[e.to] = min(h[e.to], h[v] + e.cost); } } } void Dijkstra(const int s) { priority_queue< pti, vector< pti >, greater< pti > > que; fill(dist.begin(), dist.end(), inf); dist[s] = 0; que.push(pti(0, s)); while(!que.empty()) { pti p = que.top(); que.pop(); const int v = p.second; if(dist[v] < p.first) continue; for(int i = 0; i < (int) G[v].size(); ++i) { edge &e = G[v][i]; if(e.cap > 0 && dist[e.to] > dist[v] + e.cost + h[v] - h[e.to]) { dist[e.to] = dist[v] + e.cost + h[v] - h[e.to]; prevv[e.to] = v, preve[e.to] = i; que.push(pti(dist[e.to], e.to)); } } } } void update(const int s, const int t, Cat &f, Cot &res) { for(int i = 0; i < V; i++) { if(dist[i] != inf) h[i] += dist[i]; } Cat d = f; for(int v = t; v != s; v = prevv[v]) { d = min(d, G[prevv[v]][preve[v]].cap); } f -= d; res += h[t] * d; for(int v = t; v != s; v = prevv[v]) { edge &e = G[prevv[v]][preve[v]]; e.cap -= d; G[v][e.rev].cap += d; } } Cot solve(const int s, const int t, Cat f) { if(!tsort()) assert(false); // not DAG calc_potential(s); Cot res = 0; while(f > 0) { Dijkstra(s); if(dist[t] == inf) return -1; update(s, t, f, res); } return res; } }; int main() { int N; cin >> N; string S; cin >> S; vector< int > V(N); for(auto &v : V) cin >> v; MinCostFlowDAG< int64_t, int64_t > flow(N + N + N + 2); int X = N + N + N; int Y = X + 1; for(int i = 1; i < N; i++) { flow.add_edge(i - 1, i, flow.inf, 0); flow.add_edge(i - 1 + N, i + N, flow.inf, 0); flow.add_edge(i - 1 + N + N, i + N + N, flow.inf, 0); } for(int i = 0; i < N; i++) { if(S[i] == 'y') { flow.add_edge(X, i, 1, -V[i]); } else if(S[i] == 'u') { flow.add_edge(i, i + N, 1, -V[i]); } else if(S[i] == 'k') { flow.add_edge(i + N, i + N + N, 1, -V[i]); } else { flow.add_edge(i + N + N, Y, 1, -V[i]); } } flow.tsort(); flow.calc_potential(X); int64_t cost = 0, best = 0; for(;;) { flow.Dijkstra(X); if(flow.dist[Y] == flow.inf) break; int64_t uku = 1; flow.update(X, Y, uku, cost); best = min(best, cost); } cout << -best << "\n"; }