题目链接:BZOJ - 1901
题目分析
树状数组套线段树或线段树套线段树都可以解决这道题。
第一层是区间,第二层是权值。
空间复杂度和时间复杂度均为 O(n log^2 n)。
线段树比树状数组麻烦好多...我容易写错= =
代码
树状数组套线段树
#include <iostream>
#include <cstdlib>
#include <cstdio>
#include <cmath>
#include <algorithm>
#include <cstring> using namespace std; const int MaxN = 10000 + 5, MN = 1000000015, MaxNode = 10000 * 30 * 15 + 15; int n, m, Index, Used_Index;
int A[MaxN], Root[MaxN], Son[MaxNode][2], T[MaxNode], U[MaxN], C[MaxN]; void Add(int &x, int s, int t, int Pos, int Num)
{
if (x == 0) x = ++Index;
T[x] += Num;
if (s == t) return;
int m = (s + t) >> 1;
if (Pos <= m) Add(Son[x][0], s, m, Pos, Num);
else Add(Son[x][1], m + 1, t, Pos, Num);
} void Change(int x, int Pos, int Num)
{
for (int i = x; i <= n; i += i & -i)
Add(Root[i], 0, MN, Pos, Num);
} int Get_Sum(int x)
{
int ret = 0;
for (int i = x; i; i -= i & -i)
ret += T[Son[U[i]][0]];
return ret;
} void Init_U(int x)
{
for (int i = x; i; i -= i & -i)
U[i] = Root[i];
} void Turn(int x, int f)
{
for (int i = x; i; i -= i & -i)
{
if (C[i] == Used_Index) break;
C[i] = Used_Index;
U[i] = Son[U[i]][f];
}
} int main()
{
scanf("%d%d", &n, &m);
for (int i = 1; i <= n; ++i)
{
scanf("%d", &A[i]);
Change(i, A[i], 1);
}
char f;
int Pos, Num, L, R, k, Temp;
for (int i = 1; i <= m; ++i)
{
f = '-';
while (f < 'A' || f > 'Z') f = getchar();
if (f == 'C')
{
scanf("%d%d", &Pos, &Num);
Change(Pos, A[Pos], -1);
A[Pos] = Num;
Change(Pos, Num, 1);
}
else
{
scanf("%d%d%d", &L, &R, &k);
int l, r, mid;
l = 0; r = MN;
Init_U(L - 1);
Init_U(R);
Used_Index = 0;
while (l < r)
{
mid = (l + r) >> 1;
Temp = Get_Sum(R) - Get_Sum(L - 1);
++Used_Index;
if (Temp >= k)
{
r = mid;
Turn(L - 1, 0);
Turn(R, 0);
}
else
{
l = mid + 1;
k -= Temp;
Turn(L - 1, 1);
Turn(R, 1);
}
}
printf("%d\n", l);
}
}
return 0;
}
线段树套线段树
#include <iostream>
#include <cstdio>
#include <cstdlib>
#include <cstring>
#include <cmath>
#include <algorithm> using namespace std; const int MaxN = 10000 + 5, MN = 1000000000 + 15, MaxNode = 10000 * 30 * 15 + 15; int n, m, Index, Used_Index;
int A[MaxN], Root[MaxN * 4], T[MaxNode], Son[MaxNode][2], U[MaxN * 4], C[MaxN * 4]; void Add(int &x, int s, int t, int Pos, int Num)
{
if (x == 0) x = ++Index;
T[x] += Num;
if (s == t) return;
int m = (s + t) >> 1;
if (Pos <= m) Add(Son[x][0], s, m, Pos, Num);
else Add(Son[x][1], m + 1, t, Pos, Num);
} void Change(int x, int s, int t, int Pos, int Pos_2, int Num)
{
Add(Root[x], 0, MN, Pos_2, Num);
if (s == t) return;
int m = (s + t) >> 1;
if (Pos <= m) Change(x << 1, s, m, Pos, Pos_2, Num);
else Change(x << 1 | 1, m + 1, t, Pos, Pos_2, Num);
} void Init_U(int x, int s, int t, int Pos)
{
if (Pos >= t)
{
U[x] = Root[x];
return;
}
int m = (s + t) >> 1;
Init_U(x << 1, s, m, Pos);
if (Pos >= m + 1) Init_U(x << 1 | 1, m + 1, t, Pos);
} void Turn(int x, int s, int t, int Pos, int f)
{
if (Pos >= t)
{
if (C[x] == Used_Index) return;
C[x] = Used_Index;
U[x] = Son[U[x]][f];
return;
}
int m = (s + t) >> 1;
Turn(x << 1, s, m, Pos, f);
if (Pos >= m + 1) Turn(x << 1 | 1, m + 1, t, Pos, f);
} int Get_Sum(int x, int s, int t, int Pos)
{
if (Pos >= t) return T[Son[U[x]][0]];
int ret = 0, m = (s + t) >> 1;
ret += Get_Sum(x << 1, s, m, Pos);
if (Pos >= m + 1) ret += Get_Sum(x << 1 | 1, m + 1, t, Pos);
return ret;
} int main()
{
scanf("%d%d", &n, &m);
for (int i = 1; i <= n; ++i)
{
scanf("%d", &A[i]);
Change(1, 0, n, i, A[i], 1);
}
char f;
int L, R, Pos, Num, k;
for (int i = 1; i <= m; ++i)
{
f = '-';
while (f < 'A' || f > 'Z') f = getchar();
if (f == 'C')
{
scanf("%d%d", &Pos, &Num);
Change(1, 0, n, Pos, A[Pos], -1);
A[Pos] = Num;
Change(1, 0, n, Pos, Num, 1);
}
else
{
scanf("%d%d%d", &L, &R, &k);
int l, r, mid, Temp;
Used_Index = 0;
Init_U(1, 0, n, L - 1);
Init_U(1, 0, n, R);
l = 0; r = MN;
while (l < r)
{
++Used_Index;
mid = (l + r) >> 1;
Temp = Get_Sum(1, 0, n, R) - Get_Sum(1, 0, n, L - 1);
if (Temp >= k)
{
r = mid;
Turn(1, 0, n, R, 0);
Turn(1, 0, n, L - 1, 0);
}
else
{
l = mid + 1;
Turn(1, 0, n, R, 1);
Turn(1, 0, n, L - 1, 1);
k -= Temp;
}
}
printf("%d\n", l);
}
}
return 0;
}