#pragma GCC optimize ("O3") #pragma GCC target ("avx") #include "bits/stdc++.h" // define macro "/D__MAI" using namespace std; typedef unsigned int uint; typedef long long int ll; typedef unsigned long long int ull; #define debugv(v) printf("L%d %s => ",__LINE__,#v);for(auto e:v){cout< ",__LINE__,#m);for(int x=0;x<(w);x++){cout<<(m)[x]<<" ";}cout<=l;--cnt) #define BIGINT 0x7FFFFFFF #define MD 1000000007ll #define PI 3.1415926535897932384626433832795 template ostream& operator <<(ostream &o, const pair p) { o << "(" << p.first << ":" << p.second << ")"; return o; } #define TIME chrono::system_clock::now() #define MILLISEC(t) (chrono::duration_cast(t).count()) namespace { std::chrono::system_clock::time_point ttt; void tic() { ttt = TIME; } void toc() { fprintf(stderr, "TIME : %lldms\n", MILLISEC(TIME - ttt)); } std::chrono::system_clock::time_point tle = TIME; #ifdef __MAI void safe_tle(int msec) { assert(MILLISEC(TIME - tle) < msec); } #else #define safe_tle(k) ; #endif } #ifdef __MAI //_getchar_nolock #define getchar_unlocked getchar #endif namespace { class MaiScanner { public: template void input_integer(T& var) { var = 0; T sign = 1; int cc = getchar_unlocked(); for (; cc<'0' || '9'>(int& var) { input_integer(var); return *this; } inline MaiScanner& operator>>(long long& var) { input_integer(var); return *this; } }; } MaiScanner scanner; // 隣接行列を保持するグラフ class Graph2d { public: size_t n; vector matrix; Graph2d(size_t size) :n(size), matrix(size*size) {}; void resize(size_t s) { n = s; matrix.resize(n*n); } inline int& at(int y, int x) { return matrix[y*n + x]; } inline int& operator()(int y, int x) { return matrix[y*n + x]; } inline int at(int y, int x) const { return matrix[y*n + x]; } inline int operator()(int y, int x) const { return matrix[y*n + x]; } inline void connect(int u, int v, int dist = 1) { at(u, v) = at(v, u) = dist; } inline void connect_d(int u, int v, int dist = 1) { // directedEdge u->v at(u, v) = dist; } }; void warshall_floyd(Graph2d& g) { int i, j, k; for (i = 0; i < g.n; i++) { for (j = 0; j < g.n; j++) { for (k = 0; k < g.n; k++) { g(j, k) = min(g(j, k), g(j, i) + g(i, k)); } } } } int n, m; int ss[100]; int main() { scanner >> n; repeat(n) { scanner >> ss[cnt]; } scanner >> m; Graph2d graph(n); fill(ALL(graph.matrix), 98989898); int a, b, c; repeat(m) { scanner >> a >> b >> c; graph.connect(a, b, c); } warshall_floyd(graph); int result = 98989898; for (int u = 1; u < n - 1; ++u) { for (int v = 1; v < n - 1; ++v) { if (u == v) continue; result = min(result, graph(0, v) + graph(v, u) + graph(u, n - 1) + ss[v] + ss[u] ); } } cout << result << endl; return 0; }