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Number Theoretic Transform.cpp
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const ll mod=786433;
vi getdivs(int p)
{
int q=p-1;
vi div;
for(int j=2; j*j<=q; j++)
{
if(q%j==0)
{
div.pb(j);
while(q%j==0) q/=j;
}
}
if(q!=1) div.pb(q);
return div;
}
bool check(int e, int p, vi divs)
{
for(auto d: divs)
{
if(bigmod((ll)e,(ll)(p-1)/d,(ll)p)==1)
return false;
}
return true;
}
int getRoot(int p)
{
int e=2;
vi divs=getdivs(p);
while(!check(e,p,divs)) e++;
return e;
}
/* getRoot(mod) returns a value which is used as prr in the following code
and G in the next one */
// Code 1
ll ipow(ll a, ll b, ll m = mod)
{
ll ret = 1;
while (b)
{
if (b & 1) ret = ret * a % m;
a = a * a % m;
b >>= 1;
}
return ret;
}
namespace fft{
typedef ll base;
void fft(vector<base> &a, bool inv){
int n = a.size(), j = 0;
vector<base> roots(n/2);
for(int i=1; i<n; i++){
int bit = (n >> 1);
while(j >= bit){
j -= bit;
bit >>= 1;
}
j += bit;
if(i < j) swap(a[i], a[j]);
}
int prr = 10; // Got from calling getRoot(mod);
int ang = ipow(prr, (mod - 1) / n);
if(inv) ang = ipow(ang, mod - 2);
for(int i=0; i<n/2; i++){
roots[i] = (i ? (1ll * roots[i-1] * ang % mod) : 1);
}
for(int i=2; i<=n; i<<=1){
int step = n / i;
for(int j=0; j<n; j+=i){
for(int k=0; k<i/2; k++){
base u = a[j+k], v = a[j+k+i/2] * roots[step * k] % mod;
a[j+k] = (u+v+mod)% mod;
a[j+k+i/2] = (u-v+mod)%mod;
}
}
}
if(inv) for(int i=0; i<n; i++) a[i] *= ipow(n, mod-2), a[i] %= mod;
}
vector<ll> multiply(vector<ll> &v, vector<ll> &w){
vector<base> fv(v.begin(), v.end()), fw(w.begin(), w.end());
int n = 2; while(n < v.size() + w.size()) n <<= 1;
fv.resize(n); fw.resize(n);
fft(fv, 0); fft(fw, 0);
for(int i=0; i<n; i++) fv[i] *= fw[i];
fft(fv, 1);
vector<ll> ret(n);
for(int i=0; i<n; i++) ret[i] = fv[i];
return ret;
}
}
// Code 2
struct NTT
{
vi A, B, w[2], rev;
ll P, M, G;
NTT(ll mod) {P=mod; G=10;}
void init(ll n)
{
for(M=2; M<n; M<<=1);
M<<=1;
A.resize(M); B.resize(M);
w[0].resize(M); w[1].resize(M); rev.resize(M);
for(ll i=0; i<M; i++)
{
ll x=i, &y=rev[i];
y=0;
for(ll k=1; k<M; k<<=1, x>>=1)
(y<<=1)|=(x&1);
}
ll x=bigmod(G,(P-1)/M,mod);
ll y=bigmod(x,P-2,mod);
w[0][0]=w[1][0]=1LL;
for(ll i=1; i<M; i++)
{
w[0][i]=(w[0][i-1]*x)%P;
w[1][i]=(w[1][i-1]*y)%P;
}
}
void ntransform(vector<ll> &a, ll f)
{
for(ll i=0; i<M; i++)
{
if(i<rev[i]) swap(a[i], a[rev[i]]);
}
for(ll i=1; i<M; i<<=1)
{
for(ll j=0, t=M/(i<<1); j<M; j+=(i<<1))
{
for(ll k=0, l=0; k<i; k++, l+=t)
{
ll x=a[j+k+i]*1LL*w[f][l]%P;
ll y=a[j+k];
a[j+k+i]=y-x<0?y-x+P:y-x;
a[j+k]=y+x>=P?y+x-P:y+x;
}
}
}
if(f)
{
ll x=bigmod(M,P-2,mod);
for(ll i=0; i<M; i++) a[i]=a[i]*1LL*x%P;
}
}
void multiply(vector<ll> &X, vector<ll> &Y, vector<ll> &res)
{
init(max(X.size(),Y.size()));
for(ll i=0; i<M; i++) A[i]=B[i]=0;
for(ll i=0; i<X.size(); i++) A[i]=X[i];
for(ll i=0; i<Y.size(); i++) B[i]=Y[i];
ntransform(A,0);
ntransform(B,0);
res.clear();
res.resize(M);
for(ll i=0; i<M; i++) res[i]=A[i]*1LL*B[i]%P;
ntransform(res,1);
}
};