千分矩陣乘法題
dp[i][j]表示第i行,j狀態(tài)是否可行
矩乘就好,需要高精度
#include<bits/stdc++.h>
using namespace std;
inline void splay(
int&v){v=
0;
char c=
0;
int p=
1;
while(c<
'0'||c>
'9'){
if(c==
'-')p=-
1;c=getchar();}
while(c>=
'0'&&c<=
'9'){v=(v<<
3)+(v<<
1)+c-
'0';c=getchar();}v*=p;
}
const int MAXD =
12, DIG =
9, BASE =
1000000000;
const unsigned long long BOUND = numeric_limits <
unsigned long long> :: max () - (
unsigned long long) BASE * BASE;
class bignum{
private:
int digits[MAXD];
int D;
public:
friend ostream &
operator<<(ostream &out,bignum &c);
inline void trim(){
while(D>
1&&digits[D-
1]==
0)D--;}
inline void dealint(
long long x){
memset(digits,
0,
sizeof(digits));D=
0;
do{digits[D++]=x%BASE;x/=BASE;}
while(x>
0); }
inline void dealstr(
char *s){
memset(digits,
0,
sizeof(digits));
int len=
strlen(s),first=(len+DIG-
1)%DIG+
1;D=(len+DIG-
1)/DIG;
for(
int i=
0;i<first;i++)digits[D-
1]=digits[D-
1]*
10+s[i]-
'0';
for(
int i=first,d=D-
2;i<len;i+=DIG,d--)
for(
int j=i;j<i+DIG;j++)digits[d]=digits[d]*
10+s[j]-
'0';trim();}
inline char *print(){
trim();
char *cdigits=
new char[DIG*D+
1];
int pos=
0,d=digits[D-
1];
do{cdigits[pos++]=d%
10+
'0';d/=
10;}
while(d >
0);reverse(cdigits,cdigits+pos);
for(
int i=D-
2;i>=
0;i--,pos += DIG)
for(
int j=DIG-
1,t=digits[i];j>=
0;j--){cdigits[pos+j]=t%
10+
'0';t/=
10;}cdigits[pos]=
'\0';
return cdigits;}
bignum(){dealint(
0);}
bignum(
long long x){dealint(x);}
bignum(
int x){dealint(x);}
bignum(
char *s){dealstr(s);}
inline bool operator < (
const bignum &o)
const{
if(D != o.D)
return D < o.D;
for(
int i = D-
1; i>=
0; i--)
if(digits[i] != o.digits[i])
return digits[i] < o.digits[i];
return false;}
bool operator > (
const bignum & o)
const{
return o < *
this;}
bool operator <= (
const bignum & o)
const{
return !(o < *
this);}
bool operator >= (
const bignum & o)
const{
return !(*
this < o);}
bool operator != (
const bignum & o)
const{
return o < *
this || *
this < o;}
bool operator == (
const bignum & o)
const{
return !(o < *
this) && !(*
this < o);}
bignum &
operator++(){*
this = *
this +
1;
return *
this;}
bignum
operator ++(
int){bignum old = *
this;++(*
this);
return old;}
inline bignum
operator << (
int p)
const{bignum temp;temp.D=D+p;
for(
int i=
0;i<D;i++)temp.digits [i + p] = digits [i];
for (
int i =
0; i < p; i++)temp.digits [i] =
0;
return temp;}
inline bignum
operator >> (
int p)
const{bignum temp;temp.D=D-p;
for(
int i=
0;i<D-p;i++)temp.digits[i]=digits[i+p];
for(
int i=D-p;i<D;i++)temp.digits[i]=
0;
return temp;}
bignum &
operator += (
const bignum &b){ *
this = *
this + b;
return *
this;}
bignum &
operator -= (
const bignum &b){ *
this = *
this - b;
return *
this; }
bignum &
operator *= (
const bignum &b){ *
this = *
this * b;
return *
this; }
bignum &
operator /= (
const bignum &b){ *
this = *
this / b;
return *
this; }
bignum &
operator %= (
const bignum &b){ *
this = *
this % b;
return *
this; }
inline bignum
operator + (
const bignum &o)
const { bignum sum = o;
int carry =
0;
for (sum.D =
0; sum.D < D || carry >
0; sum.D++) { sum.digits [sum.D] += (sum.D < D ? digits [sum.D] :
0) + carry;
if (sum.digits [sum.D] >= BASE) { sum.digits [sum.D] -= BASE; carry =
1; }
else carry =
0; } sum.D = max (sum.D, o.D); sum.trim ();
return sum; }
inline bignum
operator - (
const bignum &o)
const { bignum diff = *
this;
for (
int i =
0, carry =
0; i < o.D || carry >
0; i++) { diff.digits [i] -= (i < o.D ? o.digits [i] :
0) + carry;
if (diff.digits [i] <
0) { diff.digits [i] += BASE; carry =
1; }
else carry =
0; } diff.trim ();
return diff; }
inline bignum
operator * (
const bignum &o)
const { bignum prod =
0;
unsigned long long sum =
0, carry =
0;
for (prod.D =
0; prod.D < D + o.D -
1 || carry >
0; prod.D++) { sum = carry % BASE; carry /= BASE;
for (
int j = max (prod.D - o.D +
1,
0); j <= min (D -
1, prod.D); j++) { sum += (
unsigned long long) digits [j] * o.digits [prod.D - j];
if (sum >= BOUND) { carry += sum / BASE; sum %= BASE;}}carry += sum / BASE;prod.digits [prod.D] = sum % BASE;}prod.trim ();
return prod;}
inline bignum range (
int a,
int b)
const{ bignum temp =
0; temp.D = b - a;
for (
int i =
0; i < temp.D; i++) temp.digits [i] = digits [i + a];
return temp; }
inline double double_div (
const bignum &o)
const {
double val =
0, oval =
0;
int num =
0, onum =
0;
for (
int i = D -
1; i >= max (D -
3,
0); i--, num++) val = val * BASE + digits [i];
for (
int i = o.D -
1; i >= max (o.D -
3,
0); i--, onum++) oval = oval * BASE + o.digits [i];
return val / oval * (D - num > o.D - onum ? BASE :
1); }
inline pair <bignum, bignum> divmod (
const bignum &o)
const { bignum quot =
0, rem = *
this, temp;
for (
int i = D - o.D; i >=
0; i--) { temp = rem.range (i, rem.D);
int div = (
int) temp.double_div (o); bignum mult = o * div;
while (div >
0 && temp < mult) { mult = mult - o; div--; }
while (div +
1 < BASE && !(temp < mult + o)) { mult = mult + o; div++; } rem = rem - (o * div << i);
if (div >
0) { quot.digits [i] = div; quot.D = max (quot.D, i +
1); } } quot.trim (); rem.trim ();
return make_pair (quot, rem); }
inline bignum
operator / (
const bignum &o)
const {
return divmod (o).first; }
inline bignum
operator % (
const bignum &o)
const {
return divmod (o).second; }
inline bignum power (
int exp)
const { bignum p =
1, temp = *
this;
while (
exp >
0) {
if (
exp &
1) p = p * temp;
if (
exp >
1) temp = temp * temp;
exp >>=
1; }
return p; }
inline bignum factorial()
const { bignum ans =
1, num = *
this;
if (num ==
0 || num ==
1)
return ans;
while (!(num <
0 || num ==
0)) { ans = ans * num; num = num -
1; }
return ans; } };
ostream &
operator<<(ostream &out, bignum &c) { out<<c.print();
return out; }
istream &
operator >> (istream &in,bignum &c) {
char s[
10000]; in>>s; c = s;
return in; }
bignum gcd(bignum a,bignum b){
return b==
0?a:gcd(b,a%b);}bignum n;
int m,mod;
struct M{
unsigned v[
33][
33],f;M(){
memset(v,
0,
sizeof v);f=
0;}
friend M
operator * (
const M &a,
const M &b){M c;
for(
int i=
1;i<=a.f;i++){
for(
int j=
1;j<=a.f;j++){
for(
int k=
1;k<=a.f;k++){c.v[i][j]+=a.v[i][k]*b.v[k][j];}}}c.f=a.f;
for(
int i=
1;i<=c.f;i++){
for(
int j=
1;j<=c.f;j++){c.v[i][j]%=mod;}}
return c;}
}A,B,C;
int main(){freopen(
"xxx.in",
"r",stdin);freopen(
"xxx.out",
"w",stdout);
cin>>n>>m>>mod;A.f=B.f=C.f=
1<<m;
for(
int i=
1;i<=A.f;i++)A.v[i][i]=
1;
for(
int i=
1;i<=B.f;i++){
for(
int j=
1;j<=B.f;j++){
int a=i-
1,b=j-
1,flag=
1;
for(
int k=
1;k<m;k++){
if((a&b&
3)==
3)flag=
0;
if(((a^
63)&(b^
63)&
3)==
3)flag=
0;a>>=
1,b>>=
1;}B.v[i][j]=flag;}}n=n-
1;
while(n!=
0){
if(n%
2==
1)A=A*B;n=n/
2;B=B*B;}
int ans=
0;
for(
int i=
1;i<=A.f;i++){
for(
int j=
1;j<=A.f;j++){ans+=A.v[i][j];}}
cout<<ans%mod<<endl;
}
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