【BZOJ3939】[Usaco2015 Feb]Cow Hopscotch 动态规划+线段树
【BZOJ3939】[Usaco2015 Feb]Cow Hopscotch
Description
Just like humans enjoy playing the game of Hopscotch, Farmer John's cows have invented a variant of the game for themselves to play. Being played by clumsy animals weighing nearly a ton, Cow Hopscotch almost always ends in disaster, but this has surprisingly not deterred the cows from attempting to play nearly every afternoon.
The game is played on an R by C grid (2 <= R <= 750, 2 <= C <= 750), where each square is labeled with an integer in the range 1..K (1 <= K <= R*C). Cows start in the top-left square and move to the bottom-right square by a sequence of jumps, where a jump is valid if and only if
1) You are jumping to a square labeled with a different integer than your current square,
2) The square that you are jumping to is at least one row below the current square that you are on, and
3) The square that you are jumping to is at least one column to the right of the current square that you are on.
Please help the cows compute the number of different possible sequences of valid jumps that will take them from the top-left square to the bottom-right square.
Input
Output
Output the number of different ways one can jump from the top-left square to the bottom-right square, mod 1000000007.
Sample Input
1 1 1 1
1 3 2 1
1 2 4 1
1 1 1 1
Sample Output
题解:标号不同的方案数=总方案数 - 标号相同的方案数
总的方案数我们可以用前缀和轻松搞定,标号相同的方案数怎么搞?
(一开始想用树状数组,结果发现标号种类太多RE了)
所以我们只能采用动态开点线段树,对每种标号都开一棵线段树来维护前缀和就好了
#include <cstdio> #include <cstring> #include <iostream> #include <algorithm> #define mod 1000000007 using namespace std; int n,m,K,tot; int map[800][800],f[800][800],sum[800]; struct Seg { int ls,rs,cnt; }s[6001000]; void updata(int l,int r,int &x,int y,int v) { if(!x) x=++tot; if(l==r) { s[x].cnt=(s[x].cnt+v)%mod; return ; } int mid=l+r>>1; if(y<=mid) updata(l,mid,s[x].ls,y,v); else updata(mid+1,r,s[x].rs,y,v); s[x].cnt=(s[s[x].ls].cnt+s[s[x].rs].cnt)%mod; } int query(int l,int r,int x,int y) { if(!x) return 0; if(r<=y) return s[x].cnt; int mid=l+r>>1; if(y<=mid) return query(l,mid,s[x].ls,y); return (query(l,mid,s[x].ls,y)+query(mid+1,r,s[x].rs,y))%mod; } int main() { scanf("%d%d%d",&n,&m,&K); tot=K; int i,j,t; for(i=1;i<=n;i++) for(j=1;j<=m;j++) scanf("%d",&map[i][j]); f[1][1]=1; for(i=1;i<m;i++) sum[i]=1; updata(1,m,map[1][1],1,1); for(i=2;i<n;i++) { for(j=2;j<m;j++) f[i][j]=(sum[j-1]-query(1,m,map[i][j],j-1)+mod)%mod; t=0; for(j=2;j<m;j++) { t=(t+f[i][j])%mod; sum[j]=(sum[j]+t)%mod; updata(1,m,map[i][j],j,f[i][j]); } } printf("%d",(sum[m-1]-query(1,m,map[n][m],m-1)+mod)%mod); return 0; }
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