ACM-ICPC 2018 焦作賽區網絡預賽(A B E F G H I K L)
發了博客一萬年之後才發現H1寫錯了(tao
A. Magic Mirror
題目鏈接
題面:
Jessie has a magic mirror.
Every morning she will ask the mirror: ‘Mirror mirror tell me, who is the most beautiful girl in the world?’ If the mirror says her name, she will praise the mirror: ‘Good guy!’, but if the mirror says the name of another person, she will assail the mirror: ‘Dare you say that again?’
Today Jessie asks the mirror the same question above, and you are given a series of mirror’s answers. For each answer, please output Jessie’s response. You can assume that the uppercase or lowercase letters appearing anywhere in the name will have no influence on the answer. For example, ‘Jessie’ and ‘jessie’ represent the same person.
Input
The first line contains an integer T(1 \le T \le 100)T(1≤T≤100), which is the number of test cases.
Each test case contains one line with a single-word name, which contains only English letters. The length of each name is no more than 1515.
Output
For each test case, output one line containing the answer.
樣例輸入 複製
2
Jessie
Justin
樣例輸出 複製
Good guy!
Dare you say that again?
題意:
日常簽到
思路:
日常簽到
AC代碼:
string go = "jessie";
int main()
{
//freopen("output","r",stdin);
//freopen("output","w+",stdout);
string s;
TCASE(_)
{
cin>>s;
if(s.length()!=6)
{
printf("Dare you say that again?\n");
continue;
}
for(int i=0;i<s.length();++i)
if(s[i]>='A'&&s[i]<='Z') s[i] = 'a'+(s[i]-'A');
if(s==go) printf("Good guy!\n");
else printf("Dare you say that again?\n");
}
return 0;
}
B. Mathmatical Curse(DP)
題目鏈接
題面:
A prince of the Science Continent was imprisoned in a castle because of his contempt for mathematics when he was young, and was entangled in some mathematical curses. He studied hard until he reached adulthood and decided to use his knowledge to escape the castle.
There are NN rooms from the place where he was imprisoned to the exit of the castle. In the i^{th}i
th
room, there is a wizard who has a resentment value of a[i]a[i]. The prince has MM curses, the j^{th}j
th
curse is f[j]f[j], and f[j]f[j] represents one of the four arithmetic operations, namely addition(’+’), subtraction(’-’), multiplication(’*’), and integer division(’/’). The prince’s initial resentment value is KK. Entering a room and fighting with the wizard will eliminate a curse, but the prince’s resentment value will become the result of the arithmetic operation f[j]f[j] with the wizard’s resentment value. That is, if the prince eliminates the j^{th}j
th
curse in the i^{th}i
th
room, then his resentment value will change from xx to (x\ f[j]\ a[i]x f[j] a[i]), for example, when x=1, a[i]=2, f[j]=x=1,a[i]=2,f[j]=’+’, then xx will become 1+2=31+2=3.
Before the prince escapes from the castle, he must eliminate all the curses. He must go from a[1]a[1] to a[N]a[N] in order and cannot turn back. He must also eliminate the f[1]f[1] to f[M]f[M] curses in order(It is guaranteed that N\ge MN≥M). What is the maximum resentment value that the prince may have when he leaves the castle?
Input
The first line contains an integer T(1 \le T \le 1000)T(1≤T≤1000), which is the number of test cases.
For each test case, the first line contains three non-zero integers: N(1 \le N \le 1000), M(1 \le M \le 5)N(1≤N≤1000),M(1≤M≤5) and K(-1000 \le K \le 1000K(−1000≤K≤1000), the second line contains NN non-zero integers: a[1], a[2], …, a[N](-1000 \le a[i] \le 1000)a[1],a[2],…,aN, and the third line contains MM characters: f[1], f[2], …, f[M](f[j] =f[1],f[2],…,f[M](f[j]=’+’,’-’,’*’,’/’, with no spaces in between.
Output
For each test case, output one line containing a single integer.
樣例輸入 複製
3
2 1 5
2 3
/
3 2 1
1 2 3
++
4 4 5
1 2 3 4
±*/
樣例輸出 複製
2
6
3
題意:
在給定的N個數中依次使用M個運算符,初始值爲K,求最大值。
#####思路:
很顯然就是DP,但是最大值既可以從之前的最小值轉移過來,也可以從最大值轉移過來,故用三維即可。
AC代碼:
const int MAXN = 5005;
const ll MOD = 1e9+7 ;
const int INF = 1e9+7;
int _;
using namespace std;
ll dp[MAXN][10][2];
ll aaa[MAXN];
char op[10];
ll cal(ll x, char op, ll y)
{
if(op=='+') return x+y;
if(op=='-') return x-y;
if(op=='*') return x*y;
if(op=='/') return x/y;
}
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.out","w+",stdout);
TCASE(_)
{
memset(dp,0,sizeof(dp));
int N, M, K;
scanf("%d%d%d",&N,&M,&K);
REP(i,1,N) scanf("%lld",&aaa[i]);
scanf(" %s",op+1);
REP(i,0,N)
REP(j,0,M)
dp[i][j][1] = -1e18+1, dp[i][j][0]=1e18+1;
REP(i,0,N) dp[i][0][1]=dp[i][0][0] = 1LL*K;
REP(i,1,N)
REP(j,1,min(i,M))
{
dp[i][j][1] = max(dp[i-1][j][1],cal(dp[i-1][j-1][1],op[j],aaa[i]));
dp[i][j][1] = max(dp[i][j][1],cal(dp[i-1][j-1][0],op[j],aaa[i]));
dp[i][j][0] = min(dp[i-1][j][0],cal(dp[i-1][j-1][0],op[j],aaa[i]));
dp[i][j][0] = min(dp[i][j][0],cal(dp[i-1][j-1][1],op[j],aaa[i]));
}
/*REP(i,0,N)
{
REP(j,0,M)
cout<<dp[i][j][0]<<" ";
cout<<endl;
}
cout<<endl;
REP(i,0,N)
{
REP(j,0,M)
cout<<dp[i][j][1]<<" ";
cout<<endl;
}*/
ll ans = -1e18;
REP(i,M,N) ans = max(ans,dp[i][M][1]);
printf("%lld\n",ans);
}
return 0;
}
E. Jiu Yuan Wants to Eat(樹鏈剖分+線段樹)
題目鏈接
題面:
略
題意:
給一棵樹,完成針對點權的四種詢問,分別是加法、乘法、取反和取和。其中和對取模。
思路:
樹鏈剖分+線段樹。
難點在處理取反操作,注意到取反可以轉化爲加法和乘法,那就直接上。詳情見代碼。
AC代碼:
int head[MAXN];
int curedgeno;
struct Edge{
int u, v;
int next;
Edge(int u=0, int v=0, int next=-1): u(u), v(v), next(next) {}
}edge[MAXN<<1];
void init()
{
memset(head,-1,sizeof(head));
curedgeno = 0;
}
void add_edge(int u, int v)
{
++curedgeno;
edge[curedgeno] = Edge(u,v);
edge[curedgeno].next = head[u];
head[u] = curedgeno;
}
int dep[MAXN], fa[MAXN], size[MAXN];
int son[MAXN], top[MAXN];
int pos[MAXN], rpos[MAXN]; //position in seg tree
int cursz;
void find_heavy_edge(int u, int ffa, int depth)
{
fa[u] = ffa;
dep[u] = depth;
size[u] = 1;
int maxsize = 0;
for(int i=head[u];~i;i=edge[i].next)
{
int v =edge[i].v;
if(v!=ffa)
{
find_heavy_edge(v,u,depth+1);
size[u] += size[v];
if(size[v]>maxsize)
{
maxsize = size[v];
son[u] = v;
}
}
}
}
void connect_heavy_edge(int u, int ffa)
{
pos[u] = ++cursz;
rpos[cursz] = u;
top[u] = ffa;
if(son[u]==-1) return;
connect_heavy_edge(son[u],ffa);
for(int i=head[u];i!=-1;i=edge[i].next)
{
int v = edge[i].v;
if(v!=fa[u]&&son[u]!=v)
connect_heavy_edge(v,v);
}
}
void cut_tree(int root)
{
memset(size,0,sizeof(size));
memset(son,-1,sizeof(son));
cursz = 0;
find_heavy_edge(root,0,0);
connect_heavy_edge(root,root);
}
int weight[MAXN];
int N, Q;
char opt[25];
ull summ[MAXN<<2];
ull mk_add[MAXN<<2];
ull mk_mul[MAXN<<2];
const ull go = (ull)18446744073709551615;
void push_up(int x)
{
summ[x] = summ[x<<1]+summ[x<<1|1];
}
void push_down(int l, int r, int rt)
{
if(mk_add[rt]==0&&mk_mul[rt]==1) return;
mk_add[rt<<1] = mk_add[rt<<1]*mk_mul[rt] + mk_add[rt];
mk_add[rt<<1|1] = mk_add[rt<<1|1]*mk_mul[rt] + mk_add[rt];
mk_mul[rt<<1] = mk_mul[rt]*mk_mul[rt<<1];
mk_mul[rt<<1|1] = mk_mul[rt]*mk_mul[rt<<1|1];
int mid = (r+l)>>1;
summ[rt<<1] = summ[rt<<1]*mk_mul[rt] + mk_add[rt]*(ull)(mid-l+1);
summ[rt<<1|1] = summ[rt<<1|1]*mk_mul[rt] + mk_add[rt]*(ull)(r-mid);
mk_add[rt] = 0;
mk_mul[rt] = 1;
}
void build(int l, int r, int rt)
{
mk_add[rt] = 0;
mk_mul[rt] = 1;
if(l==r)
{
summ[rt] = 0;
//cout<<rt<<" "<<weight[rpos[l]]<<endl;
return;
}
int m = (l+r)>>1;
build(l,m,rt<<1);
build(m+1,r,rt<<1|1);
push_up(rt);
}
// flag: 0 add, 1 multiply, 2 bitwise not
void update(int flag,int ql, int qr, ull num, int l, int r, int rt)
{
if(l>=ql && qr>=r)
{
if(flag==1)
{
summ[rt] *= num;
mk_add[rt] *= num;
mk_mul[rt] *= num;
}
else if(flag==0)
{
summ[rt] = summ[rt] + (ull)(r-l+1)*num;
mk_add[rt] += num;
}
else
{
summ[rt] = summ[rt]*go + (ull)go*(r-l+1);
mk_add[rt] = mk_add[rt]*go + go;
mk_mul[rt] *= go;
}
return;
}
push_down(l,r,rt);
int m = (l+r)>>1;
if(ql<=m) update(flag,ql,qr,num,l,m,rt<<1);
if(qr>m) update(flag,ql,qr,num, m+1,r,rt<<1|1);
push_up(rt);
}
ull query_sum(int ql, int qr, int l, int r, int rt)
{
if(l>=ql&&r<=qr) return summ[rt];
push_down(l,r,rt);
int mid = (l+r)>>1;
ull res = 0;
if(ql<=mid) res+=query_sum(ql,qr,l,mid,rt<<1);
if(qr>mid) res+=query_sum(ql,qr,mid+1,r,rt<<1|1);
return res;
}
ull find_sum(int u, int v)
{
int f1 = top[u], f2 = top[v];
ull res = 0;
while(f1!=f2)
{
if(dep[f1]<dep[f2])
{
swap(f1,f2);
swap(u,v);
}
res += query_sum(pos[f1],pos[u],1,cursz,1);
u = fa[f1];
f1 = top[u];
}
if(dep[u]>dep[v]) swap(u,v);
return res + query_sum(pos[u],pos[v],1,cursz,1);
}
void update_path(int u, int v, ull c, int flag)
{
//cout<<c<<endl;
int f1 = top[u], f2 = top[v];
while(f1!=f2)
{
if(dep[f1]<dep[f2])
{
swap(f1,f2);
swap(u,v);
}
update(flag,pos[f1],pos[u],c,1,cursz,1);
u = fa[f1];
f1 = top[u];
}
if(dep[u]>dep[v]) swap(u,v);
update(flag,pos[u],pos[v],c,1,cursz,1);
}
void print(int l, int r, int rt)
{
if(l==r)
{
printf("%d %llu\n",rpos[r],summ[rt]);
return;
}
int m = (l+r)>>1;
print(l,m,rt<<1);
print(m+1,r,rt<<1|1);
}
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.out","w+",stdout);
while(scanf("%d",&N)!=EOF)
{
init();
int op, u, v;
ull x;
REP(i,2,N)
{
scanf("%d",&v);
add_edge(i,v);
add_edge(v,i);
}
cut_tree(1);
build(1,cursz,1);
scanf("%d",&Q);
while(Q--)
{
scanf("%d",&op);
if(op==1)
{
scanf("%d%d%llu",&u,&v,&x);
update_path(u,v,x,1);
}
else if(op==2)
{
scanf("%d%d%llu",&u,&v,&x);
update_path(u,v,x,0);
}
else if(op==3)
{
scanf("%d%d",&u,&v);
update_path(u,v,x,2);
}
else
{
scanf("%d%d",&u,&v);
printf("%llu\n",find_sum(u,v));
}
//print(1,cursz,1);
}
}
return 0;
}
F. Modular Production Line (費用流)
題目鏈接
題面:
An automobile factory has a car production line. Now the market is oversupply and the production line is often shut down. To make full use of resources, the manager divides the entire production line into NN parts (1…N)(1…N). Some continuous parts can produce sub-products. And each of sub-products has their own value. The manager will use spare time to produce sub-products to make money. Because of the limited spare time, each part of the production line could only work at most KK times. And Because of the limited materials, each of the sub-products could be produced only once. The manager wants to know the maximum value could he make by produce sub-products.
Input
The first line of input is TT, the number of test case.
The first line of each test case contains three integers, N, KN,K and MM. (MM is the number of different sub-product).
The next MM lines each contain three integers A_i, B_i, W_iA
i
,B
i
,W
i
describing a sub-product. The sub-product has value W_iW
i
. Only A_iA
i
to B_iB
i
parts work simultaneously will the sub-product be produced (include A_iA
i
to B_iB
i
).
1 \le T \le 1001≤T≤100
1 \le K \le M \le 2001≤K≤M≤200
1 \le N \le 10^51≤N≤10
5
1 \le A_i \le B_i \le N1≤A
i
≤B
i
≤N
1 \le W_i \le 10^51≤W
i
≤10
5
Output
For each test case output the maximum value in a separate line.
樣例輸入 複製
4
10 1 3
1 2 2
2 3 4
3 4 8
10 1 3
1 3 2
2 3 4
3 4 8
100000 1 3
1 100000 100000
1 2 3
100 200 300
100000 2 3
1 100000 100000
1 150 301
100 200 300
樣例輸出 複製
10
8
100000
100301
題意:
工廠有N臺機器,每臺最多工作K次來生產M種物品,對於物品i,需要這些機器工作一次來生成,並且獲利,每種物品最多生產一次,問最大獲利。
思路:
最大費用網絡流問題。
可以參考 POJ 3680。
首先對N臺機器離散化,並對新的N個點一次連一條容量爲K費用爲0的邊,對每種物品i,連邊到,容量爲1,費用爲。
最後添加一個源點N+1和匯點N+2,連上對應邊即可。
AC代碼:
const int MAXN = 5005;
const ll MOD = 1e9+7 ;
const int INF = 1e9+7;
int _;
using namespace std;
struct edge{
int to, cap, rev;
int cost;
edge(int a=0, int b=0, int c=0, int d=0): to(a), cap(b), cost(c), rev(d) {}
};
vector<edge> G[MAXN];
int level[MAXN];
int iter[MAXN];
int pre[MAXN], pree[MAXN];
int dis[MAXN], visit[MAXN], incnt[MAXN];
int N;
int spfa(int s, int t)
{
memset(pre,-1,sizeof(pre));
memset(visit,0,sizeof(visit));
memset(incnt,0,sizeof(incnt));
for(int i=0;i<=N+1;++i) dis[i]=INF;
deque<int> q;
q.push_front(s);
visit[s] = 1;
dis[s] = 0;
int flag = 1;
int now, i, len;
while (!q.empty())
{
now = q.front();
q.pop_front();
visit[now] = 0;
len = G[now].size();
for(i=0; i<len;++i)
{
edge& tmp = G[now][i];
if (tmp.cap>0&&dis[tmp.to]>dis[now]+tmp.cost)
{
dis[tmp.to] = dis[now]+tmp.cost;
pre[tmp.to] = now;
pree[tmp.to] = i;
if (!visit[tmp.to])
{
incnt[tmp.to]++;
if(incnt[tmp.to]>N)
{
flag = 0;
break;
}
// SLF
if(!q.empty()&&dis[tmp.to]<dis[q.front()]) q.push_front(tmp.to);
else q.push_back(tmp.to);
//q.push(tmp.v);
visit[tmp.to] = 1;
}
}
}
if(!flag) break;
}
if(flag) return dis[t]!=INF;
else return 0;
}
void add_edge(int from, int to, int cap, double cost)
{
G[from].push_back(edge(to,cap,cost,G[to].size()));
G[to].push_back(edge(from,0,-cost,G[from].size()-1));
}
void bfs(int s)
{
memset(level,-1,sizeof(level));
queue<int> que;
level[s] = 0;
que.push(s);
while(!que.empty())
{
int v = que.front();
que.pop();
for(int i=0;i<G[v].size();++i)
{
edge& e = G[v][i];
if(e.cap>0 && level[e.to]<0)
{
level[e.to] = level[v] + 1;
que.push(e.to);
}
}
}
}
int dfs(int v, int t, int f)
{
if(v==t) return f;
for(int& i=iter[v]; i<G[v].size(); ++i)
{
edge& e = G[v][i];
if(e.cap>0 && level[v]<level[e.to])
{
int d = dfs(e.to, t, min(f,e.cap));
if(d>0)
{
e.cap -= d;
G[e.to][e.rev].cap += d;
return d;
}
}
}
return 0;
}
int max_flow(int s, int t)
{
int flow = 0;
while(1)
{
bfs(s);
if(level[t]<0) return flow;
memset(iter,0,sizeof(iter));
int f = dfs(s,t,INF);
while(f>0)
{
flow += f;
f = dfs(s,t,INF);
}
}
}
int maxflow;
int mfmc(int s, int t)
{
int d;
int mincost = 0;
maxflow = 0;
while(spfa(s,t))
{
d = INF;
for(int i=t; i!=s; i=pre[i])
d=min(d,G[pre[i]][pree[i]].cap);
maxflow += d;
for(int i=t; i!=s; i=pre[i])
{
edge& e = G[pre[i]][pree[i]];
e.cap -= d;
G[i][e.rev].cap += d;
}
mincost += dis[t]*d;
}
return mincost;
}
int hashx[100005];
struct point{
int x, y;
int w;
}points[MAXN];
void gomapping(int M)
{
for(int i=1;i<=M;++i)
{
hashx[i] = points[i].x;
hashx[i+M] = points[i].y;
}
sort(hashx+1,hashx+1+2*M);
int cntx = unique(hashx+1,hashx+1+2*M) - hashx;
N = --cntx;
for(int i=1;i<=M;++i)
{
points[i].x = lower_bound(hashx+1,hashx+1+cntx,points[i].x) - hashx;
points[i].y = lower_bound(hashx+1,hashx+1+cntx,points[i].y) - hashx;
}
// for(int i=1;i<=N;++i) points[i].show();
}
int main()
{
//freopen("output","r",stdin);
//freopen("output","w+",stdout);
TCASE(_)
{
int nN, M, K;
scanf("%d%d%d",&nN,&K,&M);
REP(i,1,M)
{
scanf("%d%d%d",&points[i].x,&points[i].y,&points[i].w);
points[i].y++;
}
gomapping(M);
REP(i,1,N+10) G[i].clear();
REP(i,1,N) add_edge(i,i+1,K,0);
REP(i,1,M) add_edge(points[i].x,points[i].y,1,-points[i].w);
add_edge(N+2,1,K,0);
int res = mfmc(N+2,N+1);
printf("%d\n",-res);
}
return 0;
}
G. Give Candies(規律+歐拉降冪)
題目鏈接
題面:
There are NN children in kindergarten. Miss Li bought them NN candies. To make the process more interesting, Miss Li comes up with the rule: All the children line up according to their student number (1…N)(1…N), and each time a child is invited, Miss Li randomly gives him some candies (at least one). The process goes on until there is no candy. Miss Li wants to know how many possible different distribution results are there.
Input
The first line contains an integer TT, the number of test case.
The next TT lines, each contains an integer NN.
1 \le T \le 1001≤T≤100
1 \le N \le 10^{100000}1≤N≤10
100000
Output
For each test case output the number of possible results (mod 1000000007).
樣例輸入 複製
1
4
樣例輸出 複製
8
#####題意:
有N個蛋糕分給最多N個小朋友,每人依次獲得隨機至少1塊蛋糕,問分配方案數。
#####思路:
往後推幾個就可以得到方案總數爲,但是N特別大,歐拉降冪一下即可。
#####AC代碼:
ll get_phi(ll C)
{
ll res = C;
for (int i = 2; i * i <= C; i++)
{
if (C % i == 0)
{
res = res / i * (i - 1);
while (C % i == 0)
C /= i;
}
}
if (C > 1)
res = res / C * (C - 1);
return res;
}
ll powermod(ll n,ll k, ll MOD)
{
ll ans=1;
while(k)
{
if(k&1)
{
ans=((ans%MOD)*(n%MOD))%MOD;
}
n=((n%MOD)*(n%MOD))%MOD;
k>>=1;
}
return ans;
}
string s;
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.in","w+",stdout);
ll mod = get_phi(MOD);
ll N;
TCASE(_)
{
cin>>s;
N = 0;
for(int i=0;i<s.length();++i)
{
N = (N*10LL+1LL*(s[i]-'0'))%mod;
}
N = (N-1+mod+mod);
ll ans = powermod(2,N,MOD);
cout<<ans<<endl;
}
return 0;
}
H. String ad Times(後綴自動機)
題目鏈接
題面:
略
題意:
略
思路:
後綴自動機板子題。
(後綴自動機是啥?hihocoder講的最好啦:Link
AC代碼:
queue<int> togo;
int deg[MAXN<<1];
const int CHAR = 26;
struct SAM_Node
{
SAM_Node *fa,*next[CHAR];
int len;
int id,pos;
int endpos;
SAM_Node() {}
SAM_Node(int _len)
{
endpos=0;
fa = 0;
len = _len;
memset(next,0,sizeof(next));
}
};
SAM_Node SAM_node[MAXN*2], *SAM_root, *SAM_last;
int SAM_size;
SAM_Node *newSAM_Node(int len)
{
SAM_node[SAM_size] = SAM_Node(len);
SAM_node[SAM_size].id = SAM_size;
return &SAM_node[SAM_size++];
}
SAM_Node *newSAM_Node(SAM_Node *p)
{
SAM_node[SAM_size] = *p;
SAM_node[SAM_size].id = SAM_size;
SAM_node[SAM_size].endpos = 0;
return &SAM_node[SAM_size++];
}
void SAM_init()
{
SAM_size = 0;
SAM_root = SAM_last = newSAM_Node(0);
SAM_node[0].pos = 0;
}
void SAM_add(int x,int len)
{
SAM_Node *p = SAM_last, *np = newSAM_Node(p->len+1);
deg[np->id] = 0;
np->endpos = 1LL;
np->pos = len;
SAM_last = np;
for(; p && !p->next[x]; p = p->fa)
p->next[x] = np;
if(!p)
{
np->fa = SAM_root;
deg[SAM_root->id]++;
return;
}
SAM_Node *q = p->next[x];
if(q->len == p->len + 1)
{
np->fa = q;
deg[q->id]++;
return;
}
SAM_Node *nq = newSAM_Node(q);
nq->len = p->len + 1;
deg[nq->id] = 2;
q->fa = nq;
np->fa = nq;
for(; p && p->next[x] == q; p = p->fa)
p->next[x] = nq;
}
void SAM_build(char *s)
{
SAM_init();
int len = strlen(s);
for(int i = 0; i < len; i++)
SAM_add(s[i] - 'A',i+1);
}
char sss[MAXN];
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.out","w+",stdout);
int a, b;
while(scanf(" %s%d%d",sss,&a,&b)!=EOF)
{
SAM_build(sss);
REP(i,1,SAM_size-1)
if(deg[i]==0)
togo.push(i);
while(!togo.empty())
{
int top = togo.front();
togo.pop();
if(SAM_node[top].fa==0) continue;
deg[(*SAM_node[top].fa).id]--;
(*SAM_node[top].fa).endpos += SAM_node[top].endpos;
if(deg[(*SAM_node[top].fa).id]==0) togo.push((*SAM_node[top].fa).id);
}
ll ans = 0;
REP(i,1,SAM_size-1)
{
if(SAM_node[i].endpos>=a&&SAM_node[i].endpos<=b)
ans += 1LL*(SAM_node[i].len-SAM_node[i].fa->len);
}
printf("%lld\n",ans);
}
return 0;
}
I. Save the Room
題目鏈接
題面:
Bob is a sorcerer. He lives in a cuboid room which has a length of AA, a width of BB and a height of CC, so we represent it as AA * BB * CC. One day, he finds that his room is filled with unknown dark energy. Bob wants to neutralize all the dark energy in his room with his light magic. He can summon a 11 * 11 * 22 cuboid at a time to neutralize dark energy. But the cuboid must be totally in dark energy to take effect. Can you foresee whether Bob can save his room or not?
Input
Input has TT test cases. T \le 100T≤100
For each line, there are three integers A, B, CA,B,C.
1 \le A, B, C \le 1001≤A,B,C≤100
Output
For each test case, if Bob can save his room, print"Yes", otherwise print"No".
樣例輸入 複製
1 1 2
1 1 4
1 1 1
樣例輸出 複製
Yes
Yes
No
#####題意:
日常簽到
#####思路:
日常簽到
#####AC代碼:
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.in","w+",stdout);
int A, B, C;
while(cin>>A>>B>>C)
{
int flag = 0;
if(A%2==0||B%2==0||C%2==0) flag = 1;
if(flag) cout<<"Yes"<<endl;
else cout<<"No"<<endl;
}
return 0;
}
K. Transport Ship(多重揹包DP)
題目鏈接
題面:
There are NN different kinds of transport ships on the port. The i^{th}i
th
kind of ship can carry the weight of V[i]V[i] and the number of the i^{th}i
th
kind of ship is 2^{C[i]} - 12
C[i]
−1. How many different schemes there are if you want to use these ships to transport cargo with a total weight of SS?
It is required that each ship must be full-filled. Two schemes are considered to be the same if they use the same kinds of ships and the same number for each kind.
Input
The first line contains an integer T(1 \le T \le 20)T(1≤T≤20), which is the number of test cases.
For each test case:
The first line contains two integers: N(1 \le N \le 20), Q(1 \le Q \le 10000)N(1≤N≤20),Q(1≤Q≤10000), representing the number of kinds of ships and the number of queries.
For the next NN lines, each line contains two integers: V[i](1 \le V[i] \le 20), C[i](1 \le C[i] \le 20)Vi,Ci, representing the weight the i^{th}i
th
kind of ship can carry, and the number of the i^{th}i
th
kind of ship is 2^{C[i]} - 12
C[i]
−1.
For the next QQ lines, each line contains a single integer: S(1 \le S \le 10000)S(1≤S≤10000), representing the queried weight.
Output
For each query, output one line containing a single integer which represents the number of schemes for arranging ships. Since the answer may be very large, output the answer modulo 10000000071000000007.
樣例輸入 複製
1
1 2
2 1
1
2
樣例輸出 複製
0
1
題意:
給定N種船,每種船有艘,每艘船能裝的貨物。
給Q個詢問,問要裝S的貨物的方案總數。
思路:
將船理解爲揹包,用多重揹包的拆分方法可以得到每種揹包能裝載的貨物方案,最後DP一下即可。
AC代碼:
int val[MAXN];
int dp[MAXN];
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.out","w+",stdout);
TCASE(_)
{
int N,Q;
scanf("%d%d",&N,&Q);
int v, c, tmp;
int tot = 0;
REP(i,1,N)
{
scanf("%d%d",&v,&c);
tmp = 1;
REP(j,1,c)
{
val[++tot] = tmp*v;
tmp<<=1;
}
}
memset(dp,0,sizeof(dp));
dp[0] = 1;
REP(i,1,tot)
IREP(j,10000,val[i])
dp[j] = (dp[j]+dp[j-val[i]])%MOD;
while(Q--)
{
scanf("%d",&tmp);
printf("%d\n",dp[tmp]);
}
}
return 0;
}
L. Poor God Water(AC自動機+矩陣快速冪)
題目鏈接
題面:
God Water likes to eat meat, fish and chocolate very much, but unfortunately, the doctor tells him that some sequence of eating will make them poisonous.
Every hour, God Water will eat one kind of food among meat, fish and chocolate. If there are 33 continuous hours when he eats only one kind of food, he will be unhappy. Besides, if there are 33 continuous hours when he eats all kinds of those, with chocolate at the middle hour, it will be dangerous. Moreover, if there are 33 continuous hours when he eats meat or fish at the middle hour, with chocolate at other two hours, it will also be dangerous.
Now, you are the doctor. Can you find out how many different kinds of diet that can make God Water happy and safe during NN hours? Two kinds of diet are considered the same if they share the same kind of food at the same hour. The answer may be very large, so you only need to give out the answer module 10000000071000000007.
Input
The fist line puts an integer TT that shows the number of test cases. (T \le 1000T≤1000)
Each of the next TT lines contains an integer NN that shows the number of hours. (1 \le N \le 10^{10}1≤N≤10
10
)
Output
For each test case, output a single line containing the answer.
樣例輸入 複製
3
3
4
15
樣例輸出 複製
20
46
435170
題意:
問長爲N的僅由a, b, c三種字符組成且不含子串“aaa", “bbb”, “ccc”, “acb”, “bca”, “cac”, "cbc"的串的總數。
思路:
POJ原題:POJ-2778.
只不過卡時間,把矩陣改成維數爲20的900ms卡過去(
AC代碼:
#include <iostream>
#include <iomanip>
#include <algorithm>
#include <cstring>
#include <cstdio>
#include <cstring>
#include <string>
#include <cmath>
#include <string>
#include <vector>
#include <set>
#include <map>
#include <queue>
#include <vector>
#include <stack>
#include <bitset>
using namespace std;
#define FSIO ios::sync_with_stdio(0);cin.tie(0);cout.tie(0);
#define DEBUG(a) cout<<"DEBUG: "<<(a)<<endl;
#define ll long long
#define ld long double
#define pb push_back
#define mp make_pair
#define X first
#define Y second
#define REP(i,st,ed) for(int i=st;i<=ed;++i)
#define IREP(i,st,ed) for(int i=ed;i>=st;--i)
#define TCASE(T) cin>>T;while(T--)
const int MAXN = 1005;
const ll MOD = 1e9+7 ;
const int INF = 1e9+7;
int _;
using namespace std;
struct Matrix
{
ll a[20][20];
ll R;
void init()
{
memset(a, 0, sizeof(a));
for(int i=0;i<R;++i)
a[i][i] = 1LL;
}
void print()
{
for(int i=0;i<R;++i)
{
for(int j=0;j<R;++j)
cout<<a[i][j]<<" ";
cout<<endl;
}
}
};
Matrix mul(Matrix a, Matrix b)
{
Matrix ans; ans.R = a.R;
for(int i=0; i<a.R; ++i)
for(int j=0; j<a.R; ++j)
{
ans.a[i][j] = 0;
for(int k=0; k<a.R; ++k)
{
ans.a[i][j] = (ans.a[i][j]+a.a[i][k] * b.a[k][j])%MOD;
}
}
return ans;
}
Matrix qpow(Matrix a, ll n)
{
Matrix ans;
ans.R = a.R;
ans.init();
while(n)
{
//ans.print();
if(n&1LL) ans = mul(ans, a);
a = mul(a, a);
n >>= 1LL;
}
return ans;
}
const int demension = 3;
struct Trie
{
int next[MAXN][demension],fail[MAXN],end[MAXN];
int root,L;
int newnode()
{
for (int i=0; i<demension; i++)
next[L][i]=-1;
end[L++]=0;
return L-1;
}
void init()
{
L=0;
root=newnode();
}
int change(char c)
{
if(c=='a') return 0;
else if(c=='b') return 1;
else return 2;
}
void insert(char *buf)
{
int len=strlen(buf);
int now=root;
for (int i=0; i<len; i++)
{
if (next[now][change(buf[i])]==-1)
next[now][change(buf[i])]=newnode();
now=next[now][change(buf[i])];
}
end[now]++;
}
void build ()
{
queue<int >Q;
fail[root]=root;
for (int i=0; i<demension; i++)
if (next[root][i]==-1)
next[root][i]=root;
else
{
fail[next[root][i]]=root;
Q.push(next[root][i]);
}
while (!Q.empty())
{
int now=Q.front();
if(end[fail[now]]) end[now]=1;
Q.pop();
for (int i=0; i<demension; i++)
if (next[now][i]==-1)
next[now][i]=next[fail[now]][i];
else
{
fail[next[now][i]]=next[fail[now]][i];
Q.push(next[now][i]);
}
}
}
int query(char *buf)
{
int len=strlen(buf);
int now=root;
int res=0;
for (int i=0; i<len; i++)
{
now=next[now][change(buf[i])];
int temp=now;
while (temp!=root)
{
res+=end[temp];
end[temp]=0;
temp=fail[temp];
}
}
return res;
}
Matrix rua()
{
Matrix aa;
aa.R = L;
memset(aa.a,0,sizeof(aa.a));
for(int i=0;i<L;++i)
for(int j=0;j<3;++j)
if(!end[next[i][j]])
aa.a[i][next[i][j]]++;
//aa.print();
return aa;
}
};
char str[15];
Trie AC;
int main()
{
//freopen("test.in","r",stdin);
//freopen("test.out","w+",stdout);
ll N;
AC.init();
AC.insert("aaa");
AC.insert("bbb");
AC.insert("ccc");
AC.insert("acb");
AC.insert("bca");
AC.insert("cac");
AC.insert("cbc");
AC.build();
Matrix aa = AC.rua();
//aa.print();
TCASE(_)
{
scanf("%lld",&N);
Matrix bb = qpow(aa,N);
ll ans = 0;
for(int i=0;i<bb.R;++i)
ans = (ans+bb.a[0][i])%MOD;
printf("%lld\n",ans);
}
return 0;
}