#include #include #include #include using std::cin; using std::cout; const char endl = '\n'; const int N = 1005, M = 100005; const int to[4][2] = {{0, 1}, {0, -1}, {1, 0}, {-1, 0}}; int m, n, u, s, t, flow, ans, sum; // Graph int idx, head[N], edge[M << 1], ver[M << 1], next[M << 1]; void add(int u, int v, int w) { next[idx] = head[u]; ver[idx] = v; edge[idx] = w; head[u] = idx++; } // Dinic int d[N], cur[N]; bool bfs() { memset(d, 0x00, sizeof(d)); std::queue q; d[s] = 1; q.push(s); cur[s] = head[s]; while (!q.empty()) { int u = q.front(); q.pop(); for (int i = head[u]; ~i; i = next[i]) { int v = ver[i], w = edge[i]; if (w && !d[v]) { d[v] = d[u] + 1; cur[v] = head[v]; if (v == t) return true; q.push(v); } } } return false; } int dinic(int u, int limit) { if (u == t) return limit; int flow = 0; for (int &i = cur[u]; ~i && flow < limit; i = next[i]) { int v = ver[i], w = edge[i]; if (w && d[v] == d[u] + 1) { int k = dinic(v, std::min(limit - flow, w)); if (!k) d[v] = 0; edge[i] -= k; edge[i ^ 1] += k; flow += k; } } return flow; } int main() { std::ios::sync_with_stdio(false); memset(head, 0xff, sizeof(head)); cin >> n >> m; s = 0, t = n * m + 1; for (int i = 1; i <= n; i++) { for (int j = 1; j <= m; j++) { int w, u = (i - 1) * m + j; cin >> w; sum += w; if ((i + j) & 1) { add(s, u, w); add(u, s, 0); for (int k = 0; k < 4; k++) { int xx = i + to[k][0], yy = j + to[k][1]; if (1 <= xx && xx <= n && 1 <= yy && yy <= m) { int v = (xx - 1) * m + yy; add(u, v, std::numeric_limits::max()); add(v, u, 0); } } } else { add(u, t, w); add(t, u, 0); } } } while (bfs()) { while (flow = dinic(s, std::numeric_limits::max())) ans += flow; } cout << sum - ans << endl; return 0; }