problem1 link
首先使用两个端点颜色不同的边进行连通。答案是$n-1-m$。其中$m$是联通分量的个数。
problem2 link
首先构造一个最小割的模型。左边的$n_{1}$个点与源点相连,右边的$n_{2}$个点与汇点相连。每个中间点最少有$d+1$条边(有一条到汇点/源点的边)。最小割为$ans$.
假设有$x$个割边出现在源点和$n_{1}$之间,那么$y=ans-x$个出现在$n_{2}$和汇点之间。其中$x,y$应该满足的关系为$0\leq y=ans-x \leq n_{2},0\leq x \leq n_{1},and\leq min(n_{1},n_{2})\rightarrow 0\leq x \leq ans$
左边剩下的$n_{1}-x$个点与右边剩下的$n_{2}-y$个点之间不能有边存在,否则最小割会变大。所以总的边的数量为$f(x)=n_{1}n_{2}-(n_{1}-x)(n_{2}-y)=n_{1}n_{2}-(n_{1}-x)(n_{2}-(ans-x))$
$f(x)$的最大值在$x=\frac{n_{1}-n_{2}+ans}{2}$时取得。
$0 \leq x=\frac{n_{1}-n_{2}+ans}{2} \leq ans\rightarrow -ans\leq n_{1}-n_{2}\leq ans$。当$n_{1}-n_{2}$不在这个范围时,枚举边界即可。
problem3 link
如果两个数字$x,y$的差$x-y$能被数$p$整除,那么有$x\equiv y(mod(p))$。
所以可以对每个素数计算有那些数对$(A_{i},B_{j})$的余数相等,他们的差值就含有素数$p$。最后就剩下那些素数特别大的。
这个题目应该有几组特别刁钻的测试数据,代码一直超时。
code for problem1
#include <vector>
class ChristmasTreeDecoration {
public:
int solve(const std::vector<int> &col, const std::vector<int> &x,
const std::vector<int> &y) {
int n = static_cast<int>(col.size());
int m = static_cast<int>(x.size());
father_.resize(n);
for (int i = 0; i < n; ++i) {
father_[i] = i;
}
int number = 0;
for (int i = 0; i < m; ++i) {
int u = x[i] - 1;
int v = y[i] - 1;
if (col[u] != col[v]) {
int pu = GetRoot(u);
int pv = GetRoot(v);
if (pu != pv) {
father_[pu] = pv;
++number;
}
}
}
return n - 1 - number;
}
private:
int GetRoot(int x) {
if (father_[x] == x) {
return x;
}
return father_[x] = GetRoot(father_[x]);
}
std::vector<int> father_;
};
code for problem2
#include <algorithm>
class MaximumBipartiteMatchingProblem {
public:
long long solve(int n1, int n2, int ans, int d) {
long long result = -1;
auto Update = [&](int x) {
if (x < d || ans - x < d) {
return;
}
result = std::max(result, 1ll * n2 * x + 1ll * (n1 - x) * (ans - x));
};
if (n1 > n2) {
std::swap(n1, n2);
}
if (n1 == ans) {
return 1ll * n1 * n2;
}
Update(0);
Update(d);
Update(ans - d);
Update(n1);
Update(n2);
Update((ans + n1 - n2) / 2);
Update((ans + n1 - n2) / 2 + 1);
return result;
}
};
code for problem3
#include <algorithm>
#include <vector>
constexpr int kMax = 1000;
constexpr int kMaxPrime = 31622;
int diff[kMax][kMax];
int values[kMax][kMax];
int nxt[kMax];
int head[kMaxPrime];
int tag[kMaxPrime];
int prime_tag[kMaxPrime];
class TwoNumberGroups {
static constexpr int kMod = 1000000007;
public:
int solve(const std::vector<int> &A, const std::vector<int> &numA,
const std::vector<int> &B, const std::vector<int> &numB) {
int n = static_cast<int>(A.size());
int m = static_cast<int>(B.size());
for (int i = 0; i < n; ++i) {
for (int j = 0; j < m; ++j) {
diff[i][j] = std::abs(A[i] - B[j]);
}
}
int result = 0;
for (int p = 2; p < kMaxPrime; ++p) {
if (prime_tag[p] != 1) {
for (int x = p + p; x < kMaxPrime; x += p) {
prime_tag[x] = 1;
}
for (int i = 0; i < n; ++i) {
int t = A[i] % p;
if (tag[t] != p) {
head[t] = -1;
tag[t] = p;
}
nxt[i] = head[t];
head[t] = i;
}
for (int i = 0; i < m; ++i) {
int t = B[i] % p;
if (tag[t] == p) {
for (int j = head[t]; j != -1; j = nxt[j]) {
if (A[j] != B[i]) {
values[j][i] += p;
while (diff[j][i] % p == 0) {
diff[j][i] /= p;
}
}
}
}
}
}
}
for (int i = 0; i < n; ++i) {
for (int j = 0; j < m; ++j) {
if (diff[i][j] > 1) {
values[i][j] += diff[i][j];
}
result += 1ll * numA[i] * numB[j] % kMod * values[i][j] % kMod;
if (result >= kMod) {
result -= kMod;
}
}
}
return result;
}
};