【BZOJ4803】逆欧拉函数

题面

bzoj

题解

题目是给定你\(\varphi(n)\)要求前\(k\)小的\(n\)。

设\(n=\prod_{i=1}^k{p_i}^{c_i}\)

则\(\varphi(n)=\prod_{i=1}^k{p_i}^{c_i-1}(p_i-1)\)

然后我们猜一下这个\(n\)不是很多，事实上\(n\)不超过\(50w\)个。

考虑暴力\(dfs\)出所有的\(n\)：

首先筛出\(\sqrt{\varphi(n)}\)内的素数

对于当前\(dfs\)的值\(phi\)

看\(phi\)中的约数有没有\(筛出的素数-1\)

若有，假设该素数为\(p\)

去除\(phi\)中的所有\(p\)，之后再将\(dfs\)的\(n\)累乘上\(p\)

在每一次递归开头用\(miller\)_\(Rabin\)判断\(phi+1\)是否为素数，如果是，则直接加进答案就行了

想一想,为什么?

代码

#include <iostream>

#include <cstdio>

#include <cstdlib>

#include <cstring>

#include <cmath>

#include <algorithm>

#include <ctime>

using namespace std;

typedef long long ll;

const int MAX_N = 1e7 + 5;

const int T = 10;

bool is_prime[MAX_N];

int prime[MAX_N], num, K;

ll N = 1e7, ans[MAX_N], cnt_ans;

void sieve() {

	for (int i = 1; i <= N; i++) is_prime[i] = 1;

	is_prime[1] = 0;

	for (int i = 2; i <= N; i++) {

		if (is_prime[i]) prime[++num] = i;

		for (int j = 1; prime[j] * i <= N && j <= num; j++) {

			is_prime[i * prime[j]] = 0;

			if (!(i % prime[j])) break;

		}

	}

}

ll fmul(ll x, ll y, ll Mod) {

	ll res = 0;

	while (y) {

		if (y & 1ll) res = (res + x) % Mod;

	    y >>= 1ll;

		x = (x + x) % Mod;

	}

	return res;

}

ll fpow(ll x, ll y, ll Mod) {

	ll res = 1;

	while (y) {

		if (y & 1ll) res = fmul(res, x, Mod);

		y >>= 1ll;

		x = fmul(x, x, Mod);

	}

	return res;

}

bool Test(ll a, ll n) {

	ll r = 0, t = n - 1, m;

	while ((t & 1ll) == 0) ++r, t >>= 1ll;

	m = (n - 1) / (1ll << r);

	for (int i = 0; i < r; i++) if (fpow(a, (1ll << i) * m, n) == n - 1) return 1;

	if (fpow(a, m, n) == 1) return 1;

	return 0;

}

bool Miller_Rabin(ll n) {

	if (n == 2ll) return 1;

	if (n < 2ll || ((n & 1ll) == 0)) return 0;

	for (int i = 1; i <= T; i++) {

		ll a = rand() % (n - 2) + 2;

		if (fpow(a, n - 1, n) != 1) return 0;

		if (!Test(a, n)) return 0;

	}

	return 1;

}

void solve(ll phi, ll n, int lst) {

	if (phi + 1 > prime[num] && Miller_Rabin(phi + 1))

		ans[++cnt_ans] = n * (phi + 1);

	for (int i = lst; i; i--) {

		if (!(phi % (prime[i] - 1))) {

			ll t1 = phi / (prime[i] - 1), t2 = n, t3 = 1ll;

			while (!(t1 % t3)) {

				t2 *= prime[i];

				solve(t1 / t3, t2, i - 1);

				t3 *= prime[i];

			}

		}

	}

	if (phi == 1ll) ans[++cnt_ans] = n;

}

int main () {

	srand(time(NULL));

	sieve();

	cin >> N >> K;

	solve(N, 1ll, num);

	sort(&ans[1], &ans[cnt_ans + 1]);

	for (int i = 1; i < K; i++) printf("%lld ", ans[i]);

	printf("%lld\n", ans[K]);

	return 0;

}