http://judge.u-aizu.ac.jp/onlinejudge/cdescription.jsp?cid=ACPC2017Day2&pid=H
解法(途中)
http://judge.u-aizu.ac.jp/onlinejudge/creview.jsp?rid=2538729&cid=ACPC2017Day2
下は汚いデバッグ用コードなど全部入り。
また書き直します。
数列が丸々入る部分を全探索する。
はみ出す左右の部分は三分探索で最大となるはみ出し方を見つける。
template<typename Func> int findMax(int L, int R, Func f) { //[L, R) int lo = L, hi = R; while (lo + 1 != hi) { int mi = (lo + hi) / 2; if (f(mi) - f(mi - 1) > 0) lo = mi; else hi = mi; } return lo; } int getrand(int l, int r) { // [l, r] static uint32_t y = time(NULL); y ^= (y << 13); y ^= (y >> 17); y ^= (y << 5); return y % (r - l + 1) + l; } /*------------------------ typedef long long ll; ll N, L, A[101010], D[101010]; ll K; ll sm[101010]; ll smr[101010]; //-------------------------------------------------------------------------------------------------- ll get(int idx, ll X, ll Y) { // ??°???idx???[X,Y] if (X > Y) return 0; if (L < Y) Y = L; ll a = A[idx] + (X - 1) * D[idx]; ll b = A[idx] + (Y - 1) * D[idx]; return (Y - X + 1) * (a + b) / 2; } ll getback(int idx, ll X, ll Y) { // ??°???idx???????????????[X,Y] if (X > Y) return 0; if (L < Y) Y = L; ll AA = A[idx] + (L - 1) * D[idx]; ll DD = -D[idx]; ll a = AA + (X - 1) * DD; ll b = AA + (Y - 1) * DD; return (Y - X + 1) * (a + b) / 2; } //-------------------------------------------------------------------------------------------------- ll XX, YY, res; ll f(int lef) { ll le = getback(XX - 1, 1, lef); ll ri = get(YY + 1, 1, res - lef); if (L < res - lef) return -(res - lef); if (res - lef < 1) return -(res - lef); return le + ri; } //-------------------------------------------------------------------------------------------------- ll naive() { vector<ll> v; rep(i, 0, N) rep(j, 0, L) v.push_back(A[i] + D[i] * j); //fore(i, v) printf("%lld\n", i); ll ans = 0; rep(i, 0, N * L) { int X = i; int Y = i + K - 1; if (N * L <= Y) break; ll sm = 0; rep(j, X, Y + 1) sm += v[j]; ans = max(ans, sm); } return ans; } //-------------------------------------------------------------------------------------------------- void debug() { N = getrand(1, 5), L = getrand(1, 5), K = getrand(1, N * L); rep(i, 0, N) { A[i] = getrand(0, 10); D[i] = getrand(1, 10); } } //-------------------------------------------------------------------------------------------------- ll opt() { rep(i, 0, N) sm[i] = get(i, 1, L); smr[0] = sm[0]; rep(i, 1, N) smr[i] = smr[i - 1] + sm[i]; if (K == N * L) return smr[N - 1]; if (K <= L) { ll ans = 0; rep(i, 0, N) ans = max(ans, getback(i, 1, K)); rep(i, 0, N - 1) { XX = i + 1; YY = i; res = K; int lef = findMax(0, L, f); ans = max(ans, f(lef)); } return ans; } ll cnt = K / L; ll ans = 0; rep(i, 0, N - cnt + 1) { int X = i; int Y = i + cnt - 1; ll XYsm = smr[Y]; if (X) XYsm -= smr[X - 1]; if (X == 0) ans = max(ans, XYsm + get(Y + 1, 1, K - cnt * L)); else if (Y == N - 1) { ans = max(ans, XYsm + getback(X - 1, 1, K - cnt * L)); } else { XX = X; YY = Y; res = K - cnt * L; int lef = findMax(0, res + 1, f); ans = max(ans, XYsm + f(lef)); } } cnt--; rep(i, 0, N - cnt + 1) { int X = i; int Y = i + cnt - 1; ll XYsm = smr[Y]; if (X) XYsm -= smr[X - 1]; if (X == 0) { if(K - cnt * L <= L) ans = max(ans, XYsm + get(Y + 1, 1, K - cnt * L)); } else if (Y == N - 1) { if(K - cnt * L <= L) ans = max(ans, XYsm + getback(X - 1, 1, K - cnt * L)); } else { XX = X; YY = Y; res = K - cnt * L; int lef = findMax(0, L, f); ans = max(ans, XYsm + f(lef)); } } return ans; } //-------------------------------------------------------------------------------------------------- void _main() { cin >> N >> L >> K; rep(i, 0, N) cin >> A[i] >> D[i]; //ll naive_ans = naive(); //printf("%lld\n", naive_ans); ll ans = opt(); printf("%lld\n", ans); return; rep(_, 0, 110) { debug(); ll naive_ans = naive(); //printf("%lld\n", naive_ans); ll ans = opt(); //printf("%lld\n", ans); if (naive_ans != ans) { printf("!!\n"); printf("%lld %lld %lld\n", N, L, K); rep(i, 0, N) printf("%lld %lld\n", A[i], D[i]); return; } } }
