你应该知道$FFT$是用来处理多项式乘法的吧。
那么高精度乘法和多项式乘法有什么关系呢?
观察这样一个$20$位高精度整数$11111111111111111111$
我们可以把它处理成这样的形式:$\sum_{i=0}^{19}1\times10^i$
这样就变成了一个多项式了!
直接上代码吧(以$Luogu\ P1919$为例):
#include <cmath>
#include <cstdio>
#include <algorithm>
using std::swap;const int N = 1.4e5 + 10;
const double Pi = acos(-1);
int n, m, r[N], P, ans[N];
char s[N];
struct C { double x, y; } a[N], b[N];
C operator + (C a, C b) { return (C){ a.x + b.x, a.y + b.y }; }
C operator - (C a, C b) { return (C){ a.x - b.x, a.y - b.y }; }
C operator * (C a, C b) { return (C){ a.x * b.x - a.y * b.y, a.x * b.y + b.x * a.y }; }void FFT(C f[], int opt) {for(int i = 0; i < n; ++i) if(i < r[i]) swap(f[i], f[r[i]]);for(int len = 1, nl = 2; len < n; len = nl, nl <<= 1) {C rot = (C){cos(Pi / len), opt * sin(Pi / len)};for(int l = 0; l < n; l += nl) {C w = (C){1, 0}; int r = l + len;for(int k = l; k < r; ++k, w = w * rot) {C x = f[k], y = w * f[k + len];f[k] = x + y, f[k + len] = x - y;}}}
} int main() {scanf("%d%s", &n, s + 1);for(int i = 1; i <= n; ++i) a[i - 1].x = s[n - i + 1] - '0';scanf("%s", s + 1);for(int i = 1; i <= n; ++i) b[i - 1].x = s[n - i + 1] - '0';//将字符串转化为多项式的系数--n;for(m = n + n, n = 1; n <= m; n <<= 1, ++P);for(int i = 0; i < n; ++i) r[i] = (r[i >> 1] >> 1) | ((i & 1) << (P - 1));//蝴蝶变换FFTFFT(a, 1), FFT(b, 1);for(int i = 0; i < n; ++i) a[i] = a[i] * b[i];FFT(a, -1);for(int i = 0; i <= m; ++i) ans[i] = (int)(a[i].x / n + .5);for(int i = 0, tmp1, tmp2; i < m; ++i)ans[i + 1] += (ans[i] / 10), ans[i] %= 10;//处理进位(每个系数最多为两位数)for(int i = m, flag = 0; i >= 0; --i) {if(ans[i] != 0) flag = 1;else if(!flag) continue;printf("%d", ans[i]); }//flag为前导零标记return puts("") & 0;
}
$PS:$代码中没有处理$0\times0$的情况,请读者自行处理。
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