Solving problem in Field-Extension

Правка en15, от rareone0602, 2019-05-23 17:34:23

Hello Codeforcers! As a student of department of mathematics, I'd like to demonstrate an application of Extended Field.

The idea of Extended Field

First we should include the idea of splitting field, a splitting field F of a polynomial P is the smallest field such that

I use the word "smallest" with the sense that if P split over E, .

In the other word, P decomposes into linear factor under it's splitting field.

Example

  1. P = x2 + 1 does not split over but split over where which is widely used as complex.

  2. Let p = 998244353 = 7 * 17 * 223 + 1, P = x224 - 1 does not split over but split over where . The multiplication order ord(w2) = 223.

  3. Let p = 109 + 7, Fibonacci number can be easily written as . Where φ, ψ are both root of (Remark that x2 = 5 has no root in Z_p)

Problem Solving

The problem to be demonstrated is 718C - Саша и массив, which corresponds to the third example. (This may be not the best solution for the problem. I've got several TL on this problem for large constant on module.)

In the problem, we should handle Fibonacci number 1, 1, 2, 3, 5, 8, ... with the formula . Once we have decompose the Fibonacci into two sequence of number powers. The problem becomes.

My implementation

We can implement Extended Field using C++ class, just like complex:

template<int sq = 5, int MOD = 1000000007>
class EX {
  int re, im;
  static int trim(int a) {
    if (a >= MOD) a -= MOD;
    if (a < 0) a += MOD;
    return a;
  }
  static int inv(const int a) {
    int ans = 1;
    for (int cur = a, p = MOD - 2; p; p >>= 1, cur = 1ll * cur * cur % MOD) {
      if (p&1) ans = 1ll * ans * cur % MOD;
    }
    return ans;
  };
public:
  EX(int re = 0, int im = 0) : re(re), im(im) {}
  EX& operator=(EX oth) { return re = oth.re, im = oth.im, *this; }
  int norm() const { 
    return trim((1ll * re * re - 1ll * sq * im % MOD * im) % MOD);
  }
  EX conj() const { 
    return EX(re, trim(MOD - im)); 
  }
  EX operator*(EX oth) const {
    return EX((1ll * re * oth.re + 1ll * sq * im % MOD * oth.im) % MOD,
              (1ll * re * oth.im + 1ll * im * oth.re) % MOD);
  };
  EX operator/(int n) const { 
    return EX(1ll * re * inv(n) % MOD, 1ll * im * inv(n) % MOD);
  }
  EX operator/(EX oth) const { return *this * oth.conj() / oth.norm(); }
  EX operator+(EX oth) const { return EX(trim(re + oth.re), trim(im + oth.im)); }
  EX operator-(EX oth) const {
    return EX(trim(re - oth.re), trim(im - oth.im));
  }
  EX pow(long long n) const {
    EX ans(1);
    for (EX a = *this; n; n >>= 1, a = a * a) {
      if (n&1) ans = a * ans;
    }
    return ans;
  }
  bool operator==(EX oth) const { return re == oth.re and im == oth.im; }
  bool operator!=(EX oth) const { return not (*this == oth); }
  int real() const& { return re; }
  int imag() const& { return im; }
};

Once a splitting field implementation is done, we can FFT under Zp more than. I haven't implemented it yet.

Теги #number theory, #math, polynomials

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en26 Английский rareone0602 2019-05-23 19:14:45 1
en25 Английский rareone0602 2019-05-23 19:08:03 0 (published)
en24 Английский rareone0602 2019-05-23 19:06:10 44
en23 Английский rareone0602 2019-05-23 18:51:14 36 Tiny change: ';\n~~~~~\n\n\n\nFFT\' -> ';\n~~~~~\nMy submission: [submission:54522918]\n\n\nFFT\'
en22 Английский rareone0602 2019-05-23 18:49:59 25 Tiny change: 'FFT\n---\nSince FFT n' -> 'FFT\n---\nAs the second example, since FFT n'
en21 Английский rareone0602 2019-05-23 18:46:39 127
en20 Английский rareone0602 2019-05-23 18:35:23 274
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en1 Английский rareone0602 2019-02-03 05:10:44 163 Initial revision (saved to drafts)