提出 #75872642
ソースコード 拡げる
#ifndef HIDDEN_IN_VS // 折りたたみ用
// 警告の抑制
#define _CRT_SECURE_NO_WARNINGS
// ライブラリの読み込み
#include <bits/stdc++.h>
using namespace std;
// 型名の短縮
using ll = long long; using ull = unsigned long long; // -2^63 ~ 2^63 = 9e18(int は -2^31 ~ 2^31 = 2e9)
using pii = pair<int, int>; using pll = pair<ll, ll>; using pil = pair<int, ll>; using pli = pair<ll, int>;
using vi = vector<int>; using vvi = vector<vi>; using vvvi = vector<vvi>; using vvvvi = vector<vvvi>;
using vl = vector<ll>; using vvl = vector<vl>; using vvvl = vector<vvl>; using vvvvl = vector<vvvl>;
using vb = vector<bool>; using vvb = vector<vb>; using vvvb = vector<vvb>;
using vc = vector<char>; using vvc = vector<vc>; using vvvc = vector<vvc>;
using vd = vector<double>; using vvd = vector<vd>; using vvvd = vector<vvd>;
template <class T> using priority_queue_rev = priority_queue<T, vector<T>, greater<T>>;
using Graph = vvi;
// 定数の定義
const double PI = acos(-1);
int DX[4] = { 1, 0, -1, 0 }; // 4 近傍(下,右,上,左)
int DY[4] = { 0, 1, 0, -1 };
int INF = 1001001001; ll INFL = 4004004003094073385LL; // (int)INFL = INF, (int)(-INFL) = -INF;
// 入出力高速化
struct fast_io { fast_io() { cin.tie(nullptr); ios::sync_with_stdio(false); cout << fixed << setprecision(18); } } fastIOtmp;
// 汎用マクロの定義
#define all(a) (a).begin(), (a).end()
#define sz(x) ((int)(x).size())
#define lbpos(a, x) (int)distance((a).begin(), std::lower_bound(all(a), (x)))
#define ubpos(a, x) (int)distance((a).begin(), std::upper_bound(all(a), (x)))
#define Yes(b) {cout << ((b) ? "Yes\n" : "No\n");}
#define rep(i, n) for(int i = 0, i##_len = int(n); i < i##_len; ++i) // 0 から n-1 まで昇順
#define repi(i, s, t) for(int i = int(s), i##_end = int(t); i <= i##_end; ++i) // s から t まで昇順
#define repir(i, s, t) for(int i = int(s), i##_end = int(t); i >= i##_end; --i) // s から t まで降順
#define repe(v, a) for(const auto& v : (a)) // a の全要素(変更不可能)
#define repea(v, a) for(auto& v : (a)) // a の全要素(変更可能)
#define repb(set, d) for(int set = 0, set##_ub = 1 << int(d); set < set##_ub; ++set) // d ビット全探索(昇順)
#define repis(i, set) for(int i = lsb(set), bset##i = set; i < 32; bset##i -= 1 << i, i = lsb(bset##i)) // set の全要素(昇順)
#define repp(a) sort(all(a)); for(bool a##_perm = true; a##_perm; a##_perm = next_permutation(all(a))) // a の順列全て(昇順)
#define uniq(a) {sort(all(a)); (a).erase(unique(all(a)), (a).end());} // 重複除去
#define EXIT(a) {cout << (a) << endl; exit(0);} // 強制終了
#define inQ(x, y, u, l, d, r) ((u) <= (x) && (l) <= (y) && (x) < (d) && (y) < (r)) // 半開矩形内判定
// 汎用関数の定義
template <class T> inline ll powi(T n, int k) { ll v = 1; rep(i, k) v *= n; return v; }
template <class T> inline bool chmax(T& M, const T& x) { if (M < x) { M = x; return true; } return false; } // 最大値を更新(更新されたら true を返す)
template <class T> inline bool chmin(T& m, const T& x) { if (m > x) { m = x; return true; } return false; } // 最小値を更新(更新されたら true を返す)
template <class T> inline int getb(T set, int i) { return (set >> i) & T(1); }
template <class T> inline T smod(T n, T m) { n %= m; if (n < 0) n += m; return n; } // 非負mod
// 演算子オーバーロード
template <class T, class U> inline istream& operator>>(istream& is, pair<T, U>& p) { is >> p.first >> p.second; return is; }
template <class T> inline istream& operator>>(istream& is, vector<T>& v) { repea(x, v) is >> x; return is; }
template <class T> inline vector<T>& operator--(vector<T>& v) { repea(x, v) --x; return v; }
template <class T> inline vector<T>& operator++(vector<T>& v) { repea(x, v) ++x; return v; }
#endif // 折りたたみ用
#if __has_include(<atcoder/all>)
#include <atcoder/all>
using namespace atcoder;
#ifdef _MSC_VER
#include "localACL.hpp"
#endif
using mint = modint998244353;
//using mint = static_modint<(int)1e9+7>;
//using mint = modint; // mint::set_mod(m);
using vm = vector<mint>; using vvm = vector<vm>; using vvvm = vector<vvm>; using vvvvm = vector<vvvm>; using pim = pair<int, mint>;
#endif
#ifdef _MSC_VER // 手元環境(Visual Studio)
#include "local.hpp"
#else // 提出用(gcc)
int mute_dump = 0;
int frac_print = 0;
#if __has_include(<atcoder/all>)
namespace atcoder {
inline istream& operator>>(istream& is, mint& x) { ll x_; is >> x_; x = x_; return is; }
inline ostream& operator<<(ostream& os, const mint& x) { os << x.val(); return os; }
}
#endif
inline int popcount(int n) { return __builtin_popcount(n); }
inline int popcount(ll n) { return __builtin_popcountll(n); }
inline int lsb(int n) { return n != 0 ? __builtin_ctz(n) : 32; }
inline int lsb(ll n) { return n != 0 ? __builtin_ctzll(n) : 64; }
inline int msb(int n) { return n != 0 ? (31 - __builtin_clz(n)) : -1; }
inline int msb(ll n) { return n != 0 ? (63 - __builtin_clzll(n)) : -1; }
#define dump(...)
#define dumpel(v)
#define dump_math(v)
#define input_from_file(f)
#define output_to_file(f)
#define Assert(b) { if (!(b)) { vc MLE(1<<30); rep(i,9)cout<<MLE[i]; exit(0); } } // RE の代わりに MLE を出す
#endif
// (i1, i2, i3) = (n1, n2, n3) に対する愚直解を返す.
mint naive_123(int n1, int n2, int n3) {
mint res;
n1++;
n2++;
n3++;
vi a;
rep(hoge, n1) a.push_back(1);
rep(hoge, n2) a.push_back(2);
rep(hoge, n3) a.push_back(3);
int L = sz(a);
repp(a) {
bool ok = true;
rep(i, L - 1) {
if (abs(a[i] - a[i + 1]) >= 2) {
ok = false;
break;
}
}
if (ok) res++;
}
return res;
}
// (i1, i2) = (n1, n2) に対する愚直解を返す.
vm naive_12(int n1, int n2) {
vm seq;
return seq;
}
// i1 = n1 に対する愚直解を返す.
vvm naive_1(int n1) {
vvm tbl;
return tbl;
}
// (i1,i2,i3)∈[0..n1)×[0..n2)×[0..n3) に対する愚直解を返す.
vvvm naive() {
int N1 = 8, N2 = 8, N3 = 7;
vvvm box;
rep(i1, N1) {
vvm tbl;
rep(i2, N2) {
vm seq;
rep(i3, N3) {
seq.push_back(naive_123(i1, i2, i3));
}
tbl.push_back(seq);
}
box.push_back(tbl);
}
//vvvm box(N1, vvm(N2, vm(N3)));
//rep(i1, N1) {
// dump("i1:", i1);
// rep(i2, N2) rep(i3, N3) {
// box[i1][i2][i3] = naive_123(i1, i2, i3);
// }
//}
//vvvm box(N1, vvm(N2));
//rep(i1, N1) {
// dump("i1:", i1);
// rep(i2, N2) {
// box[i1][i2] = naive_12(i1, i2);
// }
//}
//vvvm box(N1);
//rep(i1, N1) {
// dump("i1:", i1);
// box[i1] = naive_1(i1);
//}
#ifdef _MSC_VER
// 埋め込み用
string eb;
eb += "vvvm box = {\n";
rep(i1, sz(box)) {
eb += "{";
rep(i2, sz(box[i1])) {
eb += "{";
rep(i3, sz(box[i1][i2])) {
eb += to_string(box[i1][i2][i3].val()) + ",";
}
if (eb.back() == ',') eb.pop_back();
eb += "},";
}
if (eb.back() == ',') eb.pop_back();
eb += "},\n";
}
eb.pop_back(); eb.pop_back();
eb += "};\n\n";
cout << eb;
#endif
return box;
}
//【行列】
template <class T>
struct Matrix {
int n, m; // 行列のサイズ(n 行 m 列)
vector<vector<T>> v; // 行列の成分
// n×m 零行列で初期化する.
Matrix(int n, int m) : n(n), m(m), v(n, vector<T>(m)) {}
// n×n 単位行列で初期化する.
Matrix(int n) : n(n), m(n), v(n, vector<T>(n)) { rep(i, n) v[i][i] = T(1); }
// 二次元配列 a[0..n)[0..m) の要素で初期化する.
Matrix(const vector<vector<T>>& a) : n(sz(a)), m(sz(a[0])), v(a) {}
Matrix() : n(0), m(0) {}
// 代入
Matrix(const Matrix&) = default;
Matrix& operator=(const Matrix&) = default;
// アクセス
inline vector<T> const& operator[](int i) const { return v[i]; }
inline vector<T>& operator[](int i) {return v[i];}
// 入力
friend istream& operator>>(istream& is, Matrix& a) {
rep(i, a.n) rep(j, a.m) is >> a.v[i][j];
return is;
}
// 行の追加
void push_back(const vector<T>& a) {
Assert(sz(a) == m);
v.push_back(a);
n++;
}
// 行の削除
void pop_back() {
Assert(n > 0);
v.pop_back();
n--;
}
// サイズ変更
void resize(int n_) {
v.resize(n_);
n = n_;
}
void resize(int n_, int m_) {
n = n_;
m = m_;
v.resize(n);
rep(i, n) v[i].resize(m);
}
// 空か
bool empty() const { return min(n, m) == 0; }
// 比較
bool operator==(const Matrix& b) const { return n == b.n && m == b.m && v == b.v; }
bool operator!=(const Matrix& b) const { return !(*this == b); }
// 加算,減算,スカラー倍
Matrix& operator+=(const Matrix& b) {
rep(i, n) rep(j, m) v[i][j] += b[i][j];
return *this;
}
Matrix& operator-=(const Matrix& b) {
rep(i, n) rep(j, m) v[i][j] -= b[i][j];
return *this;
}
Matrix& operator*=(const T& c) {
rep(i, n) rep(j, m) v[i][j] *= c;
return *this;
}
Matrix operator+(const Matrix& b) const { return Matrix(*this) += b; }
Matrix operator-(const Matrix& b) const { return Matrix(*this) -= b; }
Matrix operator*(const T& c) const { return Matrix(*this) *= c; }
friend Matrix operator*(const T& c, const Matrix<T>& a) { return a * c; }
Matrix operator-() const { return Matrix(*this) *= T(-1); }
// 行列ベクトル積 : O(m n)
vector<T> operator*(const vector<T>& x) const {
vector<T> y(n);
rep(i, n) rep(j, m) y[i] += v[i][j] * x[j];
return y;
}
// ベクトル行列積 : O(m n)
friend vector<T> operator*(const vector<T>& x, const Matrix& a) {
vector<T> y(a.m);
rep(i, a.n) rep(j, a.m) y[j] += x[i] * a[i][j];
return y;
}
// 積:O(n^3)
Matrix operator*(const Matrix& b) const {
Matrix res(n, b.m);
rep(i, res.n) rep(k, m) rep(j, res.m) res[i][j] += v[i][k] * b[k][j];
return res;
}
Matrix& operator*=(const Matrix& b) { *this = *this * b; return *this; }
// 累乗:O(n^3 log d)
Matrix pow(ll d) const {
Matrix res(n), pow2 = *this;
while (d > 0) {
if (d & 1) res *= pow2;
pow2 *= pow2;
d >>= 1;
}
return res;
}
#ifdef _MSC_VER
friend ostream& operator<<(ostream& os, const Matrix& a) {
rep(i, a.n) {
os << "[";
rep(j, a.m) os << a[i][j] << " ]"[j == a.m - 1];
if (i < a.n - 1) os << "\n";
}
return os;
}
#endif
};
//【線形方程式】O(n m min(n, m))
template <class T>
vector<T> gauss_jordan_elimination(const Matrix<T>& A, const vector<T>& b, vector<vector<T>>* xs = nullptr) {
int n = A.n, m = A.m;
// v : 拡大係数行列 (A | b)
vector<vector<T>> v(n, vector<T>(m + 1));
rep(i, n) rep(j, m) v[i][j] = A[i][j];
rep(i, n) v[i][m] = b[i];
// pivots[i] : 第 i 行のピボットが第何列にあるか
vi pivots;
// 注目位置を v[i][j] とする.
int i = 0, j = 0;
while (i < n && j <= m) {
// 注目列の下方の行から非 0 成分を見つける.
int i2 = i;
while (i2 < n && v[i2][j] == T(0)) i2++;
// 見つからなかったら注目位置を右に移す.
if (i2 == n) { j++; continue; }
// 見つかったら第 i 行とその行を入れ替える.
if (i != i2) swap(v[i], v[i2]);
// v[i][j] をピボットに選択する.
pivots.push_back(j);
// v[i][j] が 1 になるよう第 i 行全体を v[i][j] で割る.
T vij_inv = T(1) / v[i][j];
repi(j2, j, m) v[i][j2] *= vij_inv;
// 第 i 行以外の第 j 列の成分が全て 0 になるよう第 i 行を定数倍して減じる.
rep(i2, n) {
if (v[i2][j] == T(0) || i2 == i) continue;
T mul = v[i2][j];
repi(j2, j, m) v[i2][j2] -= v[i][j2] * mul;
}
// 注目位置を右下に移す.
i++; j++;
}
// 最後に見つかったピボットの位置が第 m 列ならば解なし.
if (!pivots.empty() && pivots.back() == m) return vector<T>();
// A x = b の特殊解 x0 の構成(任意定数は全て 0 にする)
vector<T> x0(m);
int rnk = sz(pivots);
rep(i, rnk) x0[pivots[i]] = v[i][m];
// 同次形 A x = 0 の一般解 {x} の基底の構成(任意定数を 1-hot にする)
if (xs != nullptr) {
xs->clear();
int i = 0;
rep(j, m) {
if (i < rnk && j == pivots[i]) {
i++;
continue;
}
vector<T> x(m);
x[j] = T(1);
rep(i2, i) x[pivots[i2]] = -v[i2][j];
xs->emplace_back(move(x));
}
}
return x0;
}
// https://qiita.com/satoshin_astonish/items/a628ec64f29e77501d07
namespace satoshin {
/* 内積 */
double dot(const vl& x, const vd& y) {
double z = 0.0;
const int n = sz(x);
for (int i = 0; i < n; ++i) z += x[i] * y[i];
return z;
}
double dot(const vd& x, const vd& y) {
double z = 0.0;
const int n = sz(x);
for (int i = 0; i < n; ++i) z += x[i] * y[i];
return z;
}
double dot(const vl& x, const vl& y) {
double z = 0.0;
const int n = sz(x);
for (int i = 0; i < n; ++i) z += x[i] * y[i];
return z;
}
/* Gram-Schmidtの直交化 */
tuple<vd, vvd> Gram_Schmidt_squared(const vvl& b) {
const int n = sz(b), m = sz(b[0]); int i, j, k;
vd B(n);
vvd GSOb(n, vd(m)), mu(n, vd(n));
for (i = 0; i < n; ++i) {
mu[i][i] = 1.0;
for (j = 0; j < m; ++j) GSOb[i][j] = (double)b[i][j];
for (j = 0; j < i; ++j) {
mu[i][j] = dot(b[i], GSOb[j]) / dot(GSOb[j], GSOb[j]);
for (k = 0; k < m; ++k) GSOb[i][k] -= mu[i][j] * GSOb[j][k];
}
B[i] = dot(GSOb[i], GSOb[i]);
}
return std::forward_as_tuple(B, mu);
}
/* 部分サイズ基底簡約 */
void SizeReduce(vvl& b, vvd& mu, const int i, const int j) {
ll q;
const int m = sz(b[0]);
if (mu[i][j] > 0.5 || mu[i][j] < -0.5) {
q = (ll)round(mu[i][j]);
for (int k = 0; k < m; ++k) b[i][k] -= q * b[j][k];
for (int k = 0; k <= j; ++k) mu[i][k] -= mu[j][k] * q;
}
}
/* LLL基底簡約 */
void LLLReduce(vvl& b, const float d = 0.99) {
const int n = sz(b), m = sz(b[0]); int j, i, h;
double t, nu, BB, C;
auto [B, mu] = Gram_Schmidt_squared(b);
ll tmp;
for (int k = 1; k < n;) {
h = k - 1;
for (j = h; j > -1; --j) SizeReduce(b, mu, k, j);
//Checks if the lattice basis matrix b satisfies Lovasz condition.
if (k > 0 && B[k] < (d - mu[k][h] * mu[k][h]) * B[h]) {
for (i = 0; i < m; ++i) { tmp = b[h][i]; b[h][i] = b[k][i]; b[k][i] = tmp; }
nu = mu[k][h]; BB = B[k] + nu * nu * B[h]; C = 1.0 / BB;
mu[k][h] = nu * B[h] * C; B[k] *= B[h] * C; B[h] = BB;
for (i = 0; i <= k - 2; ++i) {
t = mu[h][i]; mu[h][i] = mu[k][i]; mu[k][i] = t;
}
for (i = k + 1; i < n; ++i) {
t = mu[i][k]; mu[i][k] = mu[i][h] - nu * t;
mu[i][h] = t + mu[k][h] * mu[i][k];
}
--k;
}
else ++k;
}
}
}
vl LLLReduce(const vvm& lat_) {
int h = sz(lat_);
int w = sz(lat_[0]);
vvl lat(h + w, vl(w));
rep(i, h) rep(j, w) lat[i][j] = lat_[i][j].val();
rep(i, w) lat[h + i][i] = mint::mod();
h = sz(lat);
satoshin::LLLReduce(lat);
// L1 ノルムをチェックする.
ll sum = 0;
rep(j, w) sum += abs(lat[0][j]);
dump("L1:", sum);
// L1 ノルムが大きいものは捨てる.
repi(i, 1, h - 1) {
ll sum2 = 0;
rep(j, w) sum2 += abs(lat[i][j]);
if (sum2 > sum * 10.) {
lat.resize(i);
h = i;
break;
}
}
dump("lat:"); frac_print = 1; dumpel(lat); frac_print = 0;
return lat[0];
}
vl LLLReduce2(const vvm& xs) {
int h = sz(xs);
int w = sz(xs[0]);
vl lat0(w);
#ifdef _MSC_VER
string cmd;
cmd += "wolframscript -code \"MOD=";
cmd += to_string(mint::mod());
cmd += ";";
cmd += "SortBy[LatticeReduce@Join[{";
rep(i, h) {
cmd += "{";
rep(j, w) {
cmd += to_string(xs[i][j].val());
cmd += ",";
}
if (cmd.back() == ',') cmd.pop_back();
cmd += "},";
}
if (cmd.back() == ',') cmd.pop_back();
cmd += "},MOD IdentityMatrix[";
cmd += to_string(w);
cmd += "]],N@Norm@# &]\"";
//dump("cmd:", cmd);
FILE* fp = _popen(cmd.c_str(), "r");
char buf[1 << 16];
while (fgets(buf, sizeof(buf), fp)) printf("%s", buf);
_pclose(fp);
stringstream ss{ buf + 2 };
rep(j, w) {
string s;
getline(ss, s, ' ');
lat0[j] = stol(s);
}
#endif
return lat0;
}
string to_signed_string(mint x) {
int v = x.val();
if (v > mint::mod() / 2) v -= mint::mod();
return to_string(v);
}
pair<vm, int> slice_1D(const vvm& tbl, int i2) {
// seq : tbl[..][i2] を抜き出した列
vm seq;
// offset : seq[0] が tbl[offset][i2] に対応することを表す.
int offset = INF;
rep(i1, sz(tbl)) {
if (i2 < sz(tbl[i1])) {
chmin(offset, i1);
seq.push_back(tbl[i1][i2]);
}
}
return { seq, offset };
}
tuple<vvm, int, int> slice_2D(const vvvm& box, int i3) {
// tbl : box[..][..][i3] を抜き出したテーブル
vvm tbl;
// offset : tbl[0][0] が box[offset1][offset2][i3] に対応することを表す.
int offset1 = INF, offset2 = INF;
rep(i1, sz(box)) {
tbl.push_back(vm());
rep(i2, sz(box[i1])) {
if (i2 < sz(box[i1]) && i3 < sz(box[i1][i2])) {
chmin(offset1, i1);
chmin(offset2, i2);
tbl.back().push_back(box[i1][i2][i3]);
}
}
if (tbl.back().empty()) tbl.pop_back();
}
return { tbl, offset1, offset2 };
}
// 変数係数線形漸化式の係数を計算し,埋め込み用のコードを出力する.
vvm embed_coefs_1D(const vm& seq, int TRM_ini, int DEG_ini, int LLL) {
int n = sz(seq);
// TRM 項間の,係数多項式の次数 DEG 未満の変数係数線形漸化式
// Σt∈[0..TRM) Σd∈[0..DEG) coefs[t][d] (i-TRM+1+t)^d seq[i-t] = 0
// を探す.
int TRM = TRM_ini, DEG = DEG_ini;
int P_MAX = max(TRM, DEG);
while (1) {
//dump("TRM:", TRM, "DEG:", DEG);
int h = n - TRM + 1;
int w = TRM * DEG;
// 行列方程式 A x = 0 を解いて一般解の基底 xs を求める.
Matrix<mint> A(h, w);
repi(i, TRM - 1, n - 1) {
rep(t, TRM) rep(d, DEG) {
A[i - TRM + 1][t * DEG + d] = mint(i - TRM + 1 + t).pow(d) * seq[i - t];
}
}
vvm xs;
gauss_jordan_elimination(A, vm(h), &xs);
// 自明解 x = 0 しか存在しない場合は失敗.
if (xs.empty()) {
while (1) {
DEG++;
if (DEG > P_MAX) { DEG = 1; TRM++; };
if (TRM > P_MAX) { TRM = 1; P_MAX++; };
if (max(TRM, DEG) == P_MAX) break;
}
continue;
}
dump("TRM:", TRM, "DEG:", DEG);
dump("#eq:", h, "#var:", w);
dump("xs:"); frac_print = 1; dumpel(xs); frac_print = 0;
// 変数係数線形漸化式の係数
vvm coefs(TRM, vm(DEG));
if (LLL == 0) {
rep(t, TRM) rep(d, DEG) coefs[t][d] = xs.back()[t * DEG + d];
}
else if (LLL == 1) {
// A x = 0 の解空間の基底に LLL を適用する.
auto lat0 = LLLReduce(xs);
rep(t, TRM) rep(d, DEG) coefs[t][d] = lat0[t * DEG + d];
}
else if (LLL == 2) {
// A x = 0 の解空間の基底に本気の LLL を適用する(埋め込み専用)
auto lat0 = LLLReduce2(xs);
rep(t, TRM) rep(d, DEG) coefs[t][d] = lat0[t * DEG + d];
}
// 分母チェック
#ifdef _MSC_VER
cout << "dnm 1D:" << endl;
string cmd;
cmd += "wolframscript -code \"MOD=";
cmd += to_string(mint::mod());
cmd += ";";
cmd += "toFrac[x_]:=Module[{},Do[num=Mod[x*dnm,MOD,-MOD/2];If[Abs[num]<=Sqrt@MOD,Return[num/dnm,Module]],{dnm,1,Sqrt@MOD}]];";
cmd += "Factor[";
rep(d, DEG) {
cmd += to_string(coefs[0][d].val());
cmd += "*(i1-";
cmd += to_string(TRM);
cmd += "+1)^";
cmd += to_string(d);
cmd += "+";
}
cmd.pop_back();
cmd += ",Modulus->MOD]/.x_Integer:>toFrac[x]\"";
//dump("cmd:", cmd);
FILE* fp = _popen(cmd.c_str(), "r");
char buf[1 << 16];
while (fgets(buf, sizeof(buf), fp)) printf("%s", buf);
_pclose(fp);
#endif
return coefs;
}
return vvm();
}
// 変数係数線形漸化式の係数を計算し,埋め込み用のコードを出力する.
pair<vvvm, vvvm> embed_coefs_2D(const vvm& tbl, int DEG1_ini, int TRM2_ini, int DEG2_ini, int LLL) {
int n1 = sz(tbl);
// TRM 項間の,係数多項式の次数 DEG 未満の変数係数線形漸化式
// Σt1∈[0..TRM1) Σd1∈[0..DEG1) Σt2∈[0..TRM2) Σd2∈[0..DEG2)
// c[t1][d1][t2][d2] (i1-TRM1+1+t1)^d1 (i2-TRM2+1+t2)^d2 tbl[i1-t1][i2-t2] = 0
// を探す.
int TRM1 = 1, DEG1 = DEG1_ini;
int TRM2 = TRM2_ini, DEG2 = DEG2_ini;
int P_MAX = max({ TRM1, DEG1, TRM2, DEG2 });
while (1) {
//dump("TRM1:", TRM1, "DEG1:", DEG1, "TRM2:", TRM2, "DEG2:", DEG2);
int w = TRM1 * DEG1 * TRM2 * DEG2;
// 行列方程式 A x = 0 を解いて一般解の基底 xs を求める.
Matrix<mint> A(0, w);
repi(i1, TRM1 - 1, n1 - 1) {
int n2 = sz(tbl[i1]);
repi(i2, TRM2 - 1, n2 - 1) {
vm a(w); bool valid = true;
rep(t1, TRM1) rep(d1, DEG1) rep(t2, TRM2) rep(d2, DEG2) {
if (i2 - t2 >= sz(tbl[i1 - t1])) {
valid = false;
t1 = TRM1;
d1 = DEG1;
t2 = TRM2;
d2 = DEG2;
break;
}
int idx = ((t1 * DEG1 + d1) * TRM2 + t2) * DEG2 + d2;
mint pow_i = mint(i1 - TRM1 + 1 + t1).pow(d1) * mint(i2 - TRM2 + 1 + t2).pow(d2);
a[idx] = pow_i * tbl[i1 - t1][i2 - t2];
}
if (valid) A.push_back(a);
}
}
int h = A.n;
vvm xs;
gauss_jordan_elimination(A, vm(h), &xs);
// 自明解 x = 0 しか存在しない場合は失敗.
if (xs.empty()) {
while (1) {
DEG2++;
if (DEG2 > P_MAX) { DEG2 = 1; TRM2++; };
if (TRM2 > P_MAX) { TRM2 = 1; DEG1++; };
if (DEG1 > P_MAX) { DEG1 = 1; TRM1++; };
if (TRM1 > 1) { TRM1 = 1; P_MAX++; };
if (max({ TRM1, DEG1, TRM2, DEG2 }) == P_MAX) break;
}
continue;
}
dump("TRM1:", TRM1, "DEG1:", DEG1, "TRM2:", TRM2, "DEG2:", DEG2);
dump("#eq:", h, "#var:", w);
dump("xs:"); frac_print = 1; dumpel(xs); frac_print = 0;
// 変数係数線形漸化式の係数
vvvm coefs(DEG1, vvm(TRM2, vm(DEG2)));
if (LLL == 0) {
rep(d1, DEG1) rep(t2, TRM2) rep(d2, DEG2) {
int idx = (d1 * TRM2 + t2) * DEG2 + d2;
coefs[d1][t2][d2] = xs.back()[idx];
}
}
else if (LLL == 1) {
// A x = 0 の解空間の基底に LLL を適用する.
auto lat0 = LLLReduce(xs);
rep(d1, DEG1) rep(t2, TRM2) rep(d2, DEG2) {
int idx = (d1 * TRM2 + t2) * DEG2 + d2;
coefs[d1][t2][d2] = lat0[idx];
}
}
else if (LLL == 2) {
// A x = 0 の解空間の基底に本気の LLL を適用する(埋め込み専用)
auto lat0 = LLLReduce2(xs);
rep(d1, DEG1) rep(t2, TRM2) rep(d2, DEG2) {
int idx = (d1 * TRM2 + t2) * DEG2 + d2;
coefs[d1][t2][d2] = lat0[idx];
}
}
// 分母チェック
#ifdef _MSC_VER
cout << "dnm 2D:" << endl;
string cmd;
cmd += "wolframscript -code \"MOD=";
cmd += to_string(mint::mod());
cmd += ";";
cmd += "toFrac[x_]:=Module[{},Do[num=Mod[x*dnm,MOD,-MOD/2];If[Abs[num]<=Sqrt@MOD,Return[num/dnm,Module]],{dnm,1,Sqrt@MOD}]];";
cmd += "Factor[";
rep(d2, DEG2) {
rep(d1, DEG1) {
cmd += to_signed_string(coefs[d1][0][d2]);
cmd += "*(i1-";
cmd += to_string(TRM1);
cmd += "+1)^";
cmd += to_string(d1);
cmd += "*(i2-";
cmd += to_string(TRM2);
cmd += "+1)^";
cmd += to_string(d2);
cmd += "+";
}
}
cmd.pop_back();
cmd += "]/.x_Integer:>toFrac[x]\"";
//dump("cmd:", cmd);
FILE* fp = _popen(cmd.c_str(), "r");
char buf[1 << 16];
while (fgets(buf, sizeof(buf), fp)) printf("%s", buf);
_pclose(fp);
#endif
// i1 方向への初項の延長
dump("------- embed_coefs_1D -------");
vvvm coefs1(TRM2 - 1);
rep(i2, TRM2 - 1) {
dump("--- i2:", i2, "---");
auto [seq, offset] = slice_1D(tbl, i2);
coefs1[i2] = embed_coefs_1D(seq, 1, 1, LLL);
}
return { coefs1, coefs };
}
return pair<vvvm, vvvm>();
}
// 変数係数線形漸化式の係数を計算し,埋め込み用のコードを出力する.
tuple<vvvvm, vvvvm, vvvvm> embed_coefs_3D(const vvvm& box, int DEG1_ini, int DEG2_ini, int TRM3_ini, int DEG3_ini, int LLL) {
int n1 = sz(box);
// TRM 項間の,係数多項式の次数 DEG 未満の変数係数線形漸化式
// Σt1∈[0..TRM1) Σd1∈[0..DEG1) Σt2∈[0..TRM2) Σd2∈[0..DEG2) Σt3∈[0..TRM3) Σd3∈[0..DEG3)
// c[t1][d1][t2][d2]][t3][d3] (i1-TRM1+1+t1)^d1 (i2-TRM2+1+t2)^d2 (i3-TRM3+1+t3)^d3 box[i1-t1][i2-t2][i3-t3] = 0
// を探す.
int TRM1 = 1, DEG1 = DEG1_ini;
int TRM2 = 1, DEG2 = DEG2_ini;
int TRM3 = TRM3_ini, DEG3 = DEG3_ini;
int P_MAX = max({ TRM1, DEG1, TRM2, DEG2, TRM3, DEG3 });
while (1) {
//dump("TRM1:", TRM1, "DEG1:", DEG1, "TRM2:", TRM2, "DEG2:", DEG2, "TRM3:", TRM3, "DEG3:", DEG3);
int w = TRM1 * DEG1 * TRM2 * DEG2 * TRM3 * DEG3;
// 行列方程式 A x = 0 を解いて一般解の基底 xs を求める.
Matrix<mint> A(0, w);
repi(i1, TRM1 - 1, n1 - 1) {
int n2 = sz(box[i1]);
repi(i2, TRM2 - 1, n2 - 1) {
int n3 = sz(box[i1][i2]);
repi(i3, TRM3 - 1, n3 - 1) {
vm a(w); bool valid = true;
rep(t1, TRM1) rep(d1, DEG1) rep(t2, TRM2) rep(d2, DEG2) rep(t3, TRM3) rep(d3, DEG3) {
if (i2 - t2 >= sz(box[i1 - t1]) || i3 - t3 >= sz(box[i1 - t1][i2 - t2])) {
valid = false;
t1 = TRM1;
d1 = DEG1;
t2 = TRM2;
d2 = DEG2;
t3 = TRM3;
d3 = DEG3;
break;
}
int idx = ((((t1 * DEG1 + d1) * TRM2 + t2) * DEG2 + d2) * TRM3 + t3) * DEG3 + d3;
mint pow_i = mint(i1 - TRM1 + 1 + t1).pow(d1) * mint(i2 - TRM2 + 1 + t2).pow(d2) * mint(i3 - TRM3 + 1 + t3).pow(d3);
a[idx] = pow_i * box[i1 - t1][i2 - t2][i3 - t3];
}
if (valid) A.push_back(a);
}
}
}
int h = A.n;
vvm xs;
gauss_jordan_elimination(A, vm(h), &xs);
// 自明解 x = 0 しか存在しない場合は失敗.
if (xs.empty()) {
while (1) {
DEG3++;
if (DEG3 > P_MAX) { DEG3 = 1; TRM3++; };
if (TRM3 > P_MAX) { TRM3 = 1; DEG2++; };
if (DEG2 > P_MAX) { DEG2 = 1; TRM2++; };
if (TRM2 > 1) { TRM2 = 1; DEG1++; };
if (DEG1 > P_MAX) { DEG1 = 1; TRM1++; };
if (TRM1 > 1) { TRM1 = 1; P_MAX++; };
if (max({ TRM1, DEG1, TRM2, DEG2, TRM3, DEG3 }) == P_MAX) break;
}
continue;
}
dump("TRM1:", TRM1, "DEG1:", DEG1, "TRM2:", TRM2, "DEG2:", DEG2, "TRM3:", TRM3, "DEG3:", DEG3);
dump("#eq:", h, "#var:", w);
dump("xs:"); frac_print = 1; dumpel(xs); frac_print = 0;
// 変数係数線形漸化式の係数
vvvvm coefs3(DEG1, vvvm(DEG2, vvm(TRM3, vm(DEG3))));
if (LLL == 0) {
rep(d1, DEG1) rep(d2, DEG2) rep(t3, TRM3) rep(d3, DEG3) {
int idx = ((d1 * DEG2 + d2) * TRM3 + t3) * DEG3 + d3;
coefs3[d1][d2][t3][d3] = xs.back()[idx];
}
}
else if (LLL == 1) {
// A x = 0 の解空間の基底に LLL を適用する.
auto lat0 = LLLReduce(xs);
rep(d1, DEG1) rep(d2, DEG2) rep(t3, TRM3) rep(d3, DEG3) {
int idx = ((d1 * DEG2 + d2) * TRM3 + t3) * DEG3 + d3;
coefs3[d1][d2][t3][d3] = lat0[idx];
}
}
else if (LLL == 2) {
// A x = 0 の解空間の基底に本気の LLL を適用する(埋め込み専用)
auto lat0 = LLLReduce2(xs);
rep(d1, DEG1) rep(d2, DEG2) rep(t3, TRM3) rep(d3, DEG3) {
int idx = ((d1 * DEG2 + d2) * TRM3 + t3) * DEG3 + d3;
coefs3[d1][d2][t3][d3] = lat0[idx];
}
}
// 分母チェック
#ifdef _MSC_VER
cout << "dnm 3D:" << endl;
string cmd;
cmd += "wolframscript -code \"MOD=";
cmd += to_string(mint::mod());
cmd += ";";
cmd += "toFrac[x_]:=Module[{},Do[num=Mod[x*dnm,MOD,-MOD/2];If[Abs[num]<=Sqrt@MOD,Return[num/dnm,Module]],{dnm,1,Sqrt@MOD}]];";
cmd += "Factor[";
rep(d3, DEG3) {
rep(d2, DEG2) {
rep(d1, DEG1) {
cmd += to_signed_string(coefs3[d1][d2][0][d3]);
cmd += "*(i1-";
cmd += to_string(TRM1);
cmd += "+1)^";
cmd += to_string(d1);
cmd += "*(i2-";
cmd += to_string(TRM2);
cmd += "+1)^";
cmd += to_string(d2);
cmd += "*(i3-";
cmd += to_string(TRM3);
cmd += "+1)^";
cmd += to_string(d3);
cmd += "+";
}
}
}
cmd.pop_back();
cmd += "]/.x_Integer:>toFrac[x]\"";
//dump("cmd:", cmd);
FILE* fp = _popen(cmd.c_str(), "r");
char buf[4096];
while (fgets(buf, sizeof(buf), fp)) printf("%s", buf);
_pclose(fp);
#endif
// (i1,i2) 平面における初項の延長
dump("------- embed_coefs_2D -------");
vvvvm coefs1(TRM3 - 1); vvvvm coefs2(TRM3 - 1);
rep(i3, TRM3 - 1) {
dump("--- i3:", i3, "---");
auto [tbl, offset1, offset2] = slice_2D(box, i3);
tie(coefs1[i3], coefs2[i3]) = embed_coefs_2D(tbl, 1, 1, 1, LLL);
}
#ifdef _MSC_VER
// 埋め込み用の文字列を出力する.
string eb;
eb += "\n";
eb += "constexpr int TRM1 = ";
eb += to_string(TRM1);
eb += ";\n";
eb += "constexpr int DEG1 = ";
eb += to_string(DEG1);
eb += ";\n";
eb += "constexpr int TRM2 = ";
eb += to_string(TRM2);
eb += ";\n";
eb += "constexpr int DEG2 = ";
eb += to_string(DEG2);
eb += ";\n";
eb += "constexpr int TRM3 = ";
eb += to_string(TRM3);
eb += ";\n";
eb += "constexpr int DEG3 = ";
eb += to_string(DEG3);
eb += ";\n\n";
eb += "vvvm coefs1[TRM3 - 1] = {";
rep(i3, TRM3 - 1) {
eb += "{\n";
rep(i2, sz(coefs1[i3])) {
eb += "{";
rep(t1, sz(coefs1[i3][i2])) {
eb += "{";
rep(d1, sz(coefs1[i3][i2][t1])) {
eb += to_signed_string(coefs1[i3][i2][t1][d1]) + ",";
}
eb.pop_back();
eb += "},";
}
eb.pop_back();
eb += "},\n";
}
eb.pop_back(); eb.pop_back();
eb += "},";
}
eb.pop_back();
eb += "};\n\n";
eb += "vvvm coefs2[TRM3 - 1] = {";
rep(i3, TRM3 - 1) {
eb += "{\n";
rep(d1, sz(coefs2[i3])) {
eb += "{";
rep(t2, sz(coefs2[i3][d1])) {
eb += "{";
rep(d2, sz(coefs2[i3][d1][t2])) {
eb += to_signed_string(coefs2[i3][d1][t2][d2]) + ",";
}
eb.pop_back();
eb += "},";
}
eb.pop_back();
eb += "},\n";
}
eb.pop_back(); eb.pop_back();
eb += "},";
}
eb.pop_back();
eb += "};\n\n";
eb += "mint coefs3[DEG1][DEG2][TRM3][DEG3] = {";
rep(d1, DEG1) {
eb += "{\n";
rep(d2, DEG2) {
eb += "{";
rep(t3, TRM3) {
eb += "{";
rep(d3, DEG3) {
eb += to_signed_string(coefs3[d1][d2][t3][d3]) + ",";
}
eb.pop_back();
eb += "},";
}
eb.pop_back();
eb += "},\n";
}
eb.pop_back(); eb.pop_back();
eb += "},";
}
eb.pop_back();
eb += "};\n\n";
cout << eb;
#endif
return { coefs1, coefs2, coefs3 };
}
return tuple<vvvvm, vvvvm, vvvvm>();
}
// 数列 seq を延長して seq[0..N] にする.
void solve_1D(vm& seq, int N, vvm coefs) {
// static int call_cnt = 0;
int TRM = sz(coefs);
int DEG = sz(coefs[0]);
int n = sz(seq);
seq.resize(N + 1);
// TRM 項間の,係数多項式の次数 DEG 未満の変数係数線形漸化式
// Σt∈[0..TRM) Σd∈[0..DEG) coefs[t][f] (i-TRM+1+t)^d a[i-t] = 0
// を用いて数列 a を延長する.
repi(i, n, N) {
mint dnm = 0;
mint pow_i = 1;
rep(d, DEG) {
dnm += coefs[0][d] * pow_i;
pow_i *= i - TRM + 1;
}
mint num = 0;
repi(t, 1, TRM - 1) {
mint pow_i = 1;
rep(d, DEG) {
num += coefs[t][d] * pow_i * seq[i - t];
pow_i *= i - TRM + 1 + t;
}
}
// dnm * a[i] + num = 0 を解く.分母 0 に注意!
if (dnm == 0) {
dump("DIVISION BY ZERO at i1 =", i);
Assert(dnm != 0);
}
seq[i] = -num / dnm;
// 除算回避用
//mint dnm_inv;
//if (call_cnt == 0) {
// dnm_inv = fm.inv_neg(1 + i);
//}
//else {
// dnm_inv = fm.inv_neg(-1 + 2 * i) * 2 * fm.inv_neg(2 + i);
//}
//seq[i] = -num * dnm_inv;
}
// call_cnt++;
}
// 2 次元数列 tbl を元に seq = tbl[N][0..M] を計算する.
vm solve_2D(const vvm& tbl, int N, int M, vvvm coefs1, vvvm coefs) {
// static int call_cnt = 0;
int TRM1 = 1;
int DEG1 = sz(coefs);
int TRM2 = sz(coefs[0]);
int DEG2 = sz(coefs[0][0]);
vm res(TRM2 - 1);
// i1 方向に tbl[..][0], ..., tbl[..][TRM2-2] を延長する.
dump("------- solve_1D -------");
rep(i2, TRM2 - 1) {
dump("--- i2:", i2, "---");
auto [seq, offset] = slice_1D(tbl, i2);
if (N - offset < 0) continue;
solve_1D(seq, N - offset, coefs1[i2]);
res[i2] = seq[N - offset];
}
vm pow_i1s(DEG1);
pow_i1s[0] = 1;
repi(d1, 1, DEG1 - 1) pow_i1s[d1] = pow_i1s[d1 - 1] * (N - TRM1 + 1);
// i2 方向に tbl[N][..] を延長する.
res.resize(M + 1);
repi(i2, TRM2 - 1, M) {
mint dnm = 0;
mint pow_i2 = 1;
rep(d2, DEG2) {
rep(d1, DEG1) {
dnm += coefs[d1][0][d2] * pow_i1s[d1] * pow_i2;
}
pow_i2 *= i2 - TRM2 + 1;
}
mint num = 0;
repi(t2, 1, TRM2 - 1) {
mint pow_i2 = 1;
rep(d2, DEG2) {
rep(d1, DEG1) {
num += coefs[d1][t2][d2] * pow_i1s[d1] * pow_i2 * res[i2 - t2];
}
pow_i2 *= i2 - TRM2 + 1 + t2;
}
}
// dnm * tbl[N][i2] + num = 0 を解く.分母 0 に注意!
if (dnm == 0) {
dump("DIVISION BY ZERO at N1 =", N, "i2 =", i2);
Assert(dnm != 0);
}
res[i2] = -num / dnm;
}
// call_cnt++;
return res;
}
// 3 次元数列 box を元に seq = tbl[N1][N2][0..N3] を計算する.
vm solve_3D(const vvvm& box, int N1, int N2, int N3, vvvvm coefs1, vvvvm coefs2, vvvvm coefs3) {
int TRM1 = 1;
int DEG1 = sz(coefs3);
int TRM2 = 1;
int DEG2 = sz(coefs3[0]);
int TRM3 = sz(coefs3[0][0]);
int DEG3 = sz(coefs3[0][0][0]);
vm res(TRM3 - 1);
// (i1,i2) 平面における延長
dump("------- solve_2D -------");
rep(i3, TRM3 - 1) {
dump("--- i3:", i3, "---");
auto [tbl, offset1, offset2] = slice_2D(box, i3);
if (N1 - offset1 < 0 || N2 - offset2 < 0) continue;
auto seq = solve_2D(tbl, N1 - offset1, N2 - offset2, coefs1[i3], coefs2[i3]);
res[i3] = seq[N2 - offset2];
}
vm pow_i1s(DEG1);
pow_i1s[0] = 1;
repi(d1, 1, DEG1 - 1) pow_i1s[d1] = pow_i1s[d1 - 1] * (N1 - TRM1 + 1);
vm pow_i2s(DEG2);
pow_i2s[0] = 1;
repi(d2, 1, DEG2 - 1) pow_i2s[d2] = pow_i2s[d2 - 1] * (N2 - TRM2 + 1);
// i3 方向に tbl[N1][N2][..] を延長する.
res.resize(N3 + 1);
repi(i3, TRM3 - 1, N3) {
mint dnm = 0;
mint pow_i3 = 1;
rep(d3, DEG3) {
rep(d2, DEG2) {
rep(d1, DEG1) {
dnm += coefs3[d1][d2][0][d3] * pow_i1s[d1] * pow_i2s[d2] * pow_i3;
}
}
pow_i3 *= i3 - TRM3 + 1;
}
mint num = 0;
repi(t3, 1, TRM3 - 1) {
mint pow_i3 = 1;
rep(d3, DEG3) {
rep(d2, DEG2) {
rep(d1, DEG1) {
num += coefs3[d1][d2][t3][d3] * pow_i1s[d1] * pow_i2s[d2] * pow_i3 * res[i3 - t3];
}
}
pow_i3 *= i3 - TRM3 + 1 + t3;
}
}
// dnm * tbl[N1][N2][i3] + num = 0 を解く.分母 0 に注意!
if (dnm == 0) {
dump("DIVISION BY ZERO at N1 =", N1, "N2 =", N2, "i3 =", i3);
Assert(dnm != 0);
}
res[i3] = -num / dnm;
}
return res;
}
// 3 次元数列 box を元に seq = tbl[N1][N2][0..N3] を計算する.
vm solve_3D(const vvvm& box, int N1, int N2, int N3) {
// --------------- embed_coefs() からの出力を貼る ----------------
constexpr int TRM1 = 1;
constexpr int DEG1 = 2;
constexpr int TRM2 = 1;
constexpr int DEG2 = 3;
constexpr int TRM3 = 3;
constexpr int DEG3 = 3;
vvvm coefs1[TRM3 - 1] = { {
{{-1},{1}}},{
{{-1},{1}},
{{-3,-1},{3,1}},
{{12,8,1},{-12,-8,-1}}} };
vvvm coefs2[TRM3 - 1] = { {
{{-2,-3,-1},{2,3,1}},
{{0,0,0},{2,1,0}}},{
{{-24,-14,-2,0},{26,3,-6,-1},{0,18,9,0},{0,-2,-1,1}},
{{0,0,0,0},{8,2,0,0},{12,8,1,0},{0,1,1,0}}} };
mint coefs3[DEG1][DEG2][TRM3][DEG3] = { {
{{0,-3,-1},{-2,2,2},{0,1,-1}},
{{3,1,0},{-3,0,0},{1,-1,0}},
{{0,0,0},{-1,0,0},{0,0,0}}},{
{{3,1,0},{-2,-2,0},{-1,1,0}},
{{0,0,0},{0,0,0},{0,0,0}},
{{0,0,0},{0,0,0},{0,0,0}}} };
// --------------------------------------------------------------
vm res(TRM3 - 1);
// (i1,i2) 平面における延長
dump("------- solve_2D -------");
rep(i3, TRM3 - 1) {
dump("--- i3:", i3, "---");
auto [tbl, offset1, offset2] = slice_2D(box, i3);
if (N1 - offset1 < 0 || N2 - offset2 < 0) continue;
auto seq = solve_2D(tbl, N1 - offset1, N2 - offset2, coefs1[i3], coefs2[i3]);
res[i3] = seq[N2 - offset2];
}
vm pow_i1s(DEG1);
pow_i1s[0] = 1;
repi(d1, 1, DEG1 - 1) pow_i1s[d1] = pow_i1s[d1 - 1] * (N1 - TRM1 + 1);
vm pow_i2s(DEG2);
pow_i2s[0] = 1;
repi(d2, 1, DEG2 - 1) pow_i2s[d2] = pow_i2s[d2 - 1] * (N2 - TRM2 + 1);
// i3 方向に tbl[N1][N2][..] を延長する.
res.resize(N3 + 1);
repi(i3, TRM3 - 1, N3) {
mint dnm = 0;
mint pow_i3 = 1;
rep(d3, DEG3) {
rep(d2, DEG2) {
rep(d1, DEG1) {
dnm += coefs3[d1][d2][0][d3] * pow_i1s[d1] * pow_i2s[d2] * pow_i3;
}
}
pow_i3 *= i3 - TRM3 + 1;
}
mint num = 0;
repi(t3, 1, TRM3 - 1) {
mint pow_i3 = 1;
rep(d3, DEG3) {
rep(d2, DEG2) {
rep(d1, DEG1) {
num += coefs3[d1][d2][t3][d3] * pow_i1s[d1] * pow_i2s[d2] * pow_i3 * res[i3 - t3];
}
}
pow_i3 *= i3 - TRM3 + 1 + t3;
}
}
// dnm * tbl[N1][N2][i3] + num = 0 を解く.分母 0 に注意!
if (dnm == 0) {
dump("DIVISION BY ZERO at N1 =", N1, "N2 =", N2, "i3 =", i3);
Assert(dnm != 0);
}
res[i3] = -num / dnm;
}
return res;
}
vvvm box = {
{{2,2,2,2,2,2,2},{6,9,12,15,18,21,24},{12,24,40,60,84,112,144},{20,50,100,175,280,420,600},{30,90,210,420,756,1260,1980},{42,147,392,882,1764,3234,5544},{56,224,672,1680,3696,7392,13728},{72,324,1080,2970,7128,15444,30888}},
{{2,2,2,2,2,2,2},{9,12,15,18,21,24,27},{24,42,64,90,120,154,192},{50,110,200,325,490,700,960},{90,240,510,945,1596,2520,3780},{147,462,1127,2352,4410,7644,12474},{224,812,2240,5208,10752,20328,35904},{324,1332,4104,10530,23760,48708,92664}},
{{2,2,2,2,2,2,2},{12,15,18,21,24,27,30},{40,64,92,124,160,200,244},{100,200,340,525,760,1050,1400},{210,510,1010,1770,2856,4340,6300},{392,1127,2562,5047,9016,14994,23604},{672,2240,5768,12656,24864,45024,76560},{1080,4104,11832,28674,61560,120780,220968}},
{{2,2,2,2,2,2,2},{15,18,21,24,27,30,33},{60,90,124,162,204,250,300},{175,325,525,780,1095,1475,1925},{420,945,1770,2970,4626,6825,9660},{882,2352,5047,9492,16317,26264,40194},{1680,5208,12656,26474,49952,87360,144096},{2970,10530,28674,66222,136404,258120,457380}},
{{2,2,2,2,2,2,2},{18,21,24,27,30,33,36},{84,120,160,204,252,304,360},{280,490,760,1095,1500,1980,2540},{756,1596,2856,4626,7002,10086,13986},{1764,4410,9016,16317,27174,42581,63672},{3696,10752,24864,49952,91112,154784,248928},{7128,23760,61560,136404,271224,497772,858600}},
{{2,2,2,2,2,2,2},{21,24,27,30,33,36,39},{112,154,200,250,304,362,424},{420,700,1050,1475,1980,2570,3250},{1260,2520,4340,6825,10086,14240,19410},{3234,7644,14994,26264,42581,65226,95641},{7392,20328,45024,87360,154784,256508,403712},{15444,48708,120780,258120,497772,889716,1499472}},
{{2,2,2,2,2,2,2},{24,27,30,33,36,39,42},{144,192,244,300,360,424,492},{600,960,1400,1925,2540,3250,4060},{1980,3780,6300,9660,13986,19410,26070},{5544,12474,23604,40194,63672,95641,137886},{13728,35904,76560,144096,248928,403712,623576},{30888,92664,220968,457380,858600,1499472,2476296}},
{{2,2,2,2,2,2,2},{27,30,33,36,39,42,45},{180,234,292,354,420,490,564},{825,1275,1815,2450,3185,4025,4975},{2970,5445,8820,13230,18816,25725,34110},{9009,19404,35574,59094,91728,135436,192381},{24024,60060,123816,226842,383208,609756,926360},{57915,166023,382239,768933,1409265,2410965,3910437}} };
int main() {
// input_from_file("input.txt");
// output_to_file("output.txt");
//【方法】
// 愚直を書いて集めたデータをもとに変数係数線形漸化式を復元する.
//【使い方】
// 1. vvm tbl = naive() を実装する.
// 2. embed_coefs() を実行する.
// 3. 出力を solve() 内に貼る.
// 4. solve(tbl, n, m) で勝手に tbl[n][0..m] を求めてくれる.
// 愚直解を用意する.再計算がイヤなら埋め込む.
// auto box = naive();
// 愚直解を渡して変数係数線形漸化式の係数を得る.再計算がイヤなら埋め込む.
// 引数:tbl, DEG1_ini, DEG2_ini, TRM3_ini, DEG3_ini, LLL
// auto [coefs1, coefs2, coefs3] = embed_coefs_3D(box, 1, 1, 1, 1, 2);
int n1, n2, n3;
cin >> n1 >> n2 >> n3;
n1--;
n2--;
n3--;
if (n1 < n3) swap(n1, n3); // なんかしらんけどこれでなおる?
// 3 次元数列 box を元に seq = box[n1][n2][0..n3] を計算する.
// 整理すると綺麗な式になるなら FullSimplify[] すると速くなる.
// auto seq = solve_3D(box, n1, n2, n3, coefs1, coefs2, coefs3);
auto seq = solve_3D(box, n1, n2, n3);
//dump(seq);
mint res = seq[n3];
EXIT(res);
}
/*
vvvm box = {
{{1}},
{{1},{1,2}},
{{1},{1,3},{1,5,9}},
{{1},{1,4},{1,7,13},{1,10,19,28}},
{{1},{1,5},{1,9,17},{1,13,25,37},{1,17,33,49,65}},
{{1},{1,6},{1,11,21},{1,16,31,46},{1,21,41,61,81},{1,26,51,76,101,126}},
{{1},{1,7},{1,13,25},{1,19,37,55},{1,25,49,73,97},{1,31,61,91,121,151},{1,37,73,109,145,181,217}},
{{1},{1,8},{1,15,29},{1,22,43,64},{1,29,57,85,113},{1,36,71,106,141,176},{1,43,85,127,169,211,253},{1,50,99,148,197,246,295,344}},
{{1},{1,9},{1,17,33},{1,25,49,73},{1,33,65,97,129},{1,41,81,121,161,201},{1,49,97,145,193,241,289},{1,57,113,169,225,281,337,393},{1,65,129,193,257,321,385,449,513}},
{{1},{1,10},{1,19,37},{1,28,55,82},{1,37,73,109,145},{1,46,91,136,181,226},{1,55,109,163,217,271,325},{1,64,127,190,253,316,379,442},{1,73,145,217,289,361,433,505,577},{1,82,163,244,325,406,487,568,649,730}}};
TRM1: 1 DEG1: 2 TRM2: 1 DEG2: 2 TRM3: 2 DEG3: 2
#eq: 165 #var: 16
xs:
0: -1 0 1 0 0 0 0 0 0 0 0 0 0 -1 0 1
dnm 3D:
-1 + i1*i2 - i1*i2*i3
------- embed_coefs_2D -------
--- i3: 0 ---
TRM1: 1 DEG1: 1 TRM2: 2 DEG2: 1
#eq: 45 #var: 2
xs:
0: -1 1
dnm 2D:
-1
------- embed_coefs_1D -------
--- i2: 0 ---
TRM: 2 DEG: 1
#eq: 9 #var: 2
xs:
0: -1 1
dnm 1D:
-1
constexpr int TRM1 = 1;
constexpr int DEG1 = 2;
constexpr int TRM2 = 1;
constexpr int DEG2 = 2;
constexpr int TRM3 = 2;
constexpr int DEG3 = 2;
vvvm coefs1[TRM3 - 1] = {{ // これの改行表示周りでなんかバグってる。
{{-1},{1}}}};
vvvm coefs2[TRM3 - 1] = {{
{{-1},{1}}}};
mint coefs3[DEG1][DEG2][TRM3][DEG3] = {{
{{-1,0},{1,0}},
{{0,0},{0,0}}},{
{{0,0},{0,0}},
{{0,-1},{0,1}}}};
5 3 6
------- solve_2D -------
--- i3: 0 ---
------- solve_1D -------
--- i2: 0 ---
91
*/
提出情報
| 提出日時 |
|
| 問題 |
E - Count 123 |
| ユーザ |
ecottea |
| 言語 |
C++23 (GCC 15.2.0) |
| 得点 |
450 |
| コード長 |
43016 Byte |
| 結果 |
AC |
| 実行時間 |
998 ms |
| メモリ |
7572 KiB |
コンパイルエラー
./Main.cpp: In function 'vm naive_12(int, int)':
./Main.cpp:137:17: warning: unused parameter 'n1' [-Wunused-parameter]
137 | vm naive_12(int n1, int n2) {
| ~~~~^~
./Main.cpp:137:25: warning: unused parameter 'n2' [-Wunused-parameter]
137 | vm naive_12(int n1, int n2) {
| ~~~~^~
./Main.cpp: In function 'vvm naive_1(int)':
./Main.cpp:145:17: warning: unused parameter 'n1' [-Wunused-parameter]
145 | vvm naive_1(int n1) {
| ~~~~^~
./Main.cpp: In function 'vl LLLReduce2(const vvm&)':
./Main.cpp:539:13: warning: unused variable 'h' [-Wunused-variable]
539 | int h = sz(xs);
| ^
ジャッジ結果
| セット名 |
Sample |
All |
| 得点 / 配点 |
0 / 0 |
450 / 450 |
| 結果 |
|
|
| セット名 |
テストケース |
| Sample |
00-sample-01.txt, 00-sample-02.txt, 00-sample-03.txt |
| All |
00-sample-01.txt, 00-sample-02.txt, 00-sample-03.txt, 01-01.txt, 01-02.txt, 01-03.txt, 01-04.txt, 01-05.txt, 01-06.txt, 01-07.txt, 01-08.txt, 01-09.txt, 01-10.txt, 01-11.txt, 01-12.txt, 01-13.txt, 01-14.txt, 01-15.txt, 01-16.txt, 01-17.txt, 01-18.txt, 01-19.txt, 01-20.txt, 01-21.txt, 01-22.txt, 01-23.txt, 01-24.txt, 01-25.txt, 01-26.txt, 01-27.txt, 01-28.txt, 01-29.txt, 01-30.txt |
| ケース名 |
結果 |
実行時間 |
メモリ |
| 00-sample-01.txt |
AC |
2 ms |
3636 KiB |
| 00-sample-02.txt |
AC |
1 ms |
3612 KiB |
| 00-sample-03.txt |
AC |
997 ms |
7476 KiB |
| 01-01.txt |
AC |
433 ms |
6908 KiB |
| 01-02.txt |
AC |
225 ms |
4768 KiB |
| 01-03.txt |
AC |
409 ms |
6484 KiB |
| 01-04.txt |
AC |
253 ms |
4976 KiB |
| 01-05.txt |
AC |
662 ms |
7196 KiB |
| 01-06.txt |
AC |
431 ms |
6108 KiB |
| 01-07.txt |
AC |
1 ms |
3516 KiB |
| 01-08.txt |
AC |
998 ms |
7528 KiB |
| 01-09.txt |
AC |
998 ms |
7528 KiB |
| 01-10.txt |
AC |
998 ms |
7532 KiB |
| 01-11.txt |
AC |
735 ms |
7476 KiB |
| 01-12.txt |
AC |
669 ms |
7508 KiB |
| 01-13.txt |
AC |
516 ms |
6828 KiB |
| 01-14.txt |
AC |
460 ms |
6648 KiB |
| 01-15.txt |
AC |
495 ms |
6908 KiB |
| 01-16.txt |
AC |
208 ms |
5272 KiB |
| 01-17.txt |
AC |
182 ms |
5520 KiB |
| 01-18.txt |
AC |
367 ms |
6832 KiB |
| 01-19.txt |
AC |
666 ms |
7572 KiB |
| 01-20.txt |
AC |
589 ms |
6908 KiB |
| 01-21.txt |
AC |
666 ms |
7476 KiB |
| 01-22.txt |
AC |
257 ms |
5208 KiB |
| 01-23.txt |
AC |
666 ms |
7564 KiB |
| 01-24.txt |
AC |
465 ms |
6356 KiB |
| 01-25.txt |
AC |
666 ms |
7528 KiB |
| 01-26.txt |
AC |
523 ms |
6704 KiB |
| 01-27.txt |
AC |
666 ms |
7524 KiB |
| 01-28.txt |
AC |
233 ms |
5076 KiB |
| 01-29.txt |
AC |
666 ms |
7420 KiB |
| 01-30.txt |
AC |
476 ms |
6328 KiB |