Problem Description
Yuanfang is puzzled with the question below:
There are n integers, a1, a2, …, an. The initial values of them are 0. There are four kinds of operations.
Operation 1: Add c to each number between ax and ay inclusive. In other words, do transformation ak<---ak+c, k = x,x+1,…,y.
Operation 2: Multiply c to each number between ax and ay inclusive. In other words, do transformation ak<---ak×c, k = x,x+1,…,y.
Operation 3: Change the numbers between ax and ay to c, inclusive. In other words, do transformation ak<---c, k = x,x+1,…,y.
Operation 4: Get the sum of p power among the numbers between ax and ay inclusive. In other words, get the result of axp+ax+1p+…+ay p.
Yuanfang has no idea of how to do it. So he wants to ask you to help him.
There are n integers, a1, a2, …, an. The initial values of them are 0. There are four kinds of operations.
Operation 1: Add c to each number between ax and ay inclusive. In other words, do transformation ak<---ak+c, k = x,x+1,…,y.
Operation 2: Multiply c to each number between ax and ay inclusive. In other words, do transformation ak<---ak×c, k = x,x+1,…,y.
Operation 3: Change the numbers between ax and ay to c, inclusive. In other words, do transformation ak<---c, k = x,x+1,…,y.
Operation 4: Get the sum of p power among the numbers between ax and ay inclusive. In other words, get the result of axp+ax+1p+…+ay p.
Yuanfang has no idea of how to do it. So he wants to ask you to help him.
Input
There are no more than 10 test cases.
For each case, the first line contains two numbers n and m, meaning that there are n integers and m operations. 1 <= n, m <= 100,000.
Each the following m lines contains an operation. Operation 1 to 3 is in this format: "1 x y c" or "2 x y c" or "3 x y c". Operation 4 is in this format: "4 x y p". (1 <= x <= y <= n, 1 <= c <= 10,000, 1 <= p <= 3)
The input ends with 0 0.
For each case, the first line contains two numbers n and m, meaning that there are n integers and m operations. 1 <= n, m <= 100,000.
Each the following m lines contains an operation. Operation 1 to 3 is in this format: "1 x y c" or "2 x y c" or "3 x y c". Operation 4 is in this format: "4 x y p". (1 <= x <= y <= n, 1 <= c <= 10,000, 1 <= p <= 3)
The input ends with 0 0.
Output
For each operation 4, output a single integer in one line representing the result. The answer may be quite large. You just need to calculate the remainder of the answer when divided by 10007.
Sample Input
5 5
3 3 5 7
1 2 4 4
4 1 5 2
2 2 5 8
4 3 5 3
0 0
Sample Output
307 7489
思路:
题目要实现多个区间更新以及一种区间查询 我们对于次方我们可以维护三棵线段树 注意lazy标记的相互影响 以及跟新的顺序
#include <bits/stdc++.h> using namespace std; const double pi = acos(-1.0); const int N = 1e5+7; const int inf = 0x3f3f3f3f; const double eps = 1e-6; typedef long long ll; const ll mod = 10007; struct tree{ int l,r; ll add,mul,cha; ll sum1,sum2,sum3; }t[N<<2]; void pushup(int p){ t[p].sum1=(t[p<<1].sum1+t[p<<1|1].sum1)%mod; t[p].sum2=(t[p<<1].sum2+t[p<<1|1].sum2)%mod; t[p].sum3=(t[p<<1].sum3+t[p<<1|1].sum3)%mod; } void build(int p,int l,int r){ t[p].sum1=t[p].sum2=t[p].sum3=t[p].add=t[p].cha=0; t[p].l=l; t[p].r=r; t[p].mul=1; if(l==r){ return ; } int mid=(l+r)>>1; build(p<<1,l,mid); build(p<<1|1,mid+1,r); } void pushdown(int p,int l,int r){ int mid=(l+r)>>1; if(t[p].cha){ t[p<<1].cha=t[p].cha; t[p<<1].sum1=(mid-l+1)*t[p].cha%mod; t[p<<1].sum2=t[p<<1].sum1*t[p].cha%mod; t[p<<1].sum3=t[p<<1].sum2*t[p].cha%mod; t[p<<1|1].cha=t[p].cha; t[p<<1|1].sum1=(r-mid)*t[p].cha%mod; t[p<<1|1].sum2=t[p<<1|1].sum1*t[p].cha%mod; t[p<<1|1].sum3=t[p<<1|1].sum2*t[p].cha%mod; t[p<<1].add=t[p<<1|1].add=0; t[p<<1].mul=t[p<<1|1].mul=1; t[p].cha=0; } if(t[p].mul!=1){ t[p<<1].mul=t[p<<1].mul*t[p].mul%mod; t[p<<1|1].mul=t[p<<1|1].mul*t[p].mul%mod; t[p<<1].sum3=t[p<<1].sum3*t[p].mul%mod*t[p].mul%mod*t[p].mul%mod; t[p<<1].sum2=t[p<<1].sum2*t[p].mul%mod*t[p].mul%mod; t[p<<1].sum1=t[p<<1].sum1*t[p].mul%mod; t[p<<1|1].sum3=t[p<<1|1].sum3*t[p].mul%mod*t[p].mul%mod*t[p].mul%mod; t[p<<1|1].sum2=t[p<<1|1].sum2*t[p].mul%mod*t[p].mul%mod; t[p<<1|1].sum1=t[p<<1|1].sum1*t[p].mul%mod; t[p<<1].add=t[p<<1].add*t[p].mul%mod; t[p<<1|1].add=t[p<<1|1].add*t[p].mul%mod; t[p].mul=1; } if(t[p].add){ t[p<<1].add=(t[p<<1].add+t[p].add)%mod; t[p<<1|1].add=(t[p<<1|1].add+t[p].add)%mod; ll c=t[p].add*t[p].add%mod*t[p].add%mod; t[p<<1].sum3=(t[p<<1].sum3+(mid-l+1)*c%mod+3*t[p].add*(t[p<<1].sum1*t[p].add%mod+t[p<<1].sum2)%mod)%mod; t[p<<1|1].sum3=(t[p<<1|1].sum3+(r-mid)*c%mod+3*t[p].add*(t[p<<1|1].sum1*t[p].add%mod+t[p<<1|1].sum2)%mod)%mod; t[p<<1].sum2=(t[p<<1].sum2+2*t[p<<1].sum1*t[p].add%mod+t[p].add*t[p].add%mod*(mid-l+1)%mod)%mod; t[p<<1|1].sum2=(t[p<<1|1].sum2+2*t[p<<1|1].sum1*t[p].add%mod+t[p].add*t[p].add%mod*(r-mid)%mod)%mod; t[p<<1].sum1=(t[p<<1].sum1+(mid-l+1)*t[p].add)%mod; t[p<<1|1].sum1=(t[p<<1|1].sum1+(r-mid)*t[p].add)%mod; t[p].add=0; } } void update(int p,int l,int r,ll v,int op){ //cout<<t[p].l<<" "<<t[p].r<<endl; if(l<=t[p].l&&t[p].r<=r){ if(op==3){ t[p].cha=v; t[p].add=0; t[p].mul=1; t[p].sum1=(t[p].r-t[p].l+1)*v%mod; t[p].sum2=t[p].sum1*v%mod; t[p].sum3=t[p].sum2*v%mod; }else if(op==2){ t[p].mul=t[p].mul*v%mod; t[p].add=t[p].add*v%mod; t[p].sum1=t[p].sum1*v%mod; t[p].sum2=t[p].sum2*v%mod*v%mod; t[p].sum3=t[p].sum3*v%mod*v%mod*v%mod; }else{ t[p].add=(t[p].add+v)%mod; t[p].sum3=(t[p].sum3+v*v%mod*v%mod*(t[p].r-t[p].l+1)%mod+3*v*(t[p].sum1*v+t[p].sum2)%mod)%mod; t[p].sum2=(t[p].sum2+v*v%mod*(t[p].r-t[p].l+1)%mod+2*v*t[p].sum1%mod)%mod; t[p].sum1=(t[p].sum1+v*(t[p].r-t[p].l+1))%mod; } return ; } pushdown(p,t[p].l,t[p].r); int mid=(t[p].l+t[p].r)>>1; if(l<=mid) update(p<<1,l,r,v,op); if(r>mid) update(p<<1|1,l,r,v,op); pushup(p); } ll query(int p,int l,int r,int op){ // cout<<p<<" "<<t[p].l<<" "<<t[p].r<<endl; if(l<=t[p].l&&t[p].r<=r){ if(op==1){ return t[p].sum1; }else if(op==2){ return t[p].sum2; }else{ return t[p].sum3; } } pushdown(p,t[p].l,t[p].r); int mid=(t[p].l+t[p].r)>>1; ll res=0; if(l<=mid) res=(res+query(p<<1,l,r,op))%mod; if(r>mid) res=(res+query(p<<1|1,l,r,op))%mod; return res; } int main(){ // ios::sync_with_stdio(false); // cin.tie(0); cout.tie(0); int n,m; while(~scanf("%d%d",&n,&m)){ if(!n&&!m) break; build(1,1,n); for(int i=1;i<=m;i++){ int op,x,y,c; scanf("%d%d%d%d",&op,&x,&y,&c); if(op==4){ printf("%lld ",query(1,x,y,c)); }else{ update(1,x,y,c,op); } } } }