(mathcal{Description})
Link.
给定一棵含有 (n) 个结点的树,设 (S) 为其中的非空联通子集,求
[sum_{S}(gcd_{uin S}u)^{|S|}.
]
(nle2 imes10^5)。
(mathcal{Solution})
直接莫反(为什么当时我迟疑那么久 qwq):
[sum_{S}(gcd_{uin S}u)^{|S|}=sum_{d=1}^nsum_{dt|s_j,j=1,2,cdots,|S|}mu(t)sum_{S}d^{|S|}.
]
前两层直接枚举,最后一个简单树上 DP,复杂度是
[sum_{i=1}^nsum_{j=1}^{frac{n}i}mathcal O(frac{n}{ij})=mathcal O(nln^2 n)?
]
记得提醒我看见 (gcd) 不要忘了莫反这家伙。(
(mathcal{Code})
/* Clearink */
#include <cstdio>
#define rep( i, l, r ) for ( int i = l, rep##i = r; i <= rep##i; ++i )
#define per( i, r, l ) for ( int i = r, per##i = l; i >= per##i; --i )
inline int rint() {
int x = 0, f = 1, s = getchar();
for ( ; s < '0' || '9' < s; s = getchar() ) f = s == '-' ? -f : f;
for ( ; '0' <= s && s <= '9'; s = getchar() ) x = x * 10 + ( s ^ '0' );
return x * f;
}
template<typename Tp>
inline void wint( Tp x ) {
if ( x < 0 ) putchar( '-' ), x = -x;
if ( 9 < x ) wint( x / 10 );
putchar( x % 10 ^ '0' );
}
const int MAXN = 2e5, MOD = 1e9 + 7;
int n, ecnt, head[MAXN + 5];
struct Edge { int to, nxt; } graph[MAXN * 2 + 5];
inline int mul( const long long a, const int b ) { return a * b % MOD; }
inline int sub( int a, const int b ) { return ( a -= b ) < 0 ? a + MOD : a; }
inline void subeq( int& a, const int b ) { ( a -= b ) < 0 && ( a += MOD ); }
inline int add( int a, const int b ) { return ( a += b ) < MOD ? a : a - MOD; }
inline void addeq( int& a, const int b ) { ( a += b ) >= MOD && ( a -= MOD ); }
inline void link( const int u, const int v ) {
graph[++ecnt] = { v, head[u] }, head[u] = ecnt;
graph[++ecnt] = { u, head[v] }, head[v] = ecnt;
}
int pn, mu[MAXN + 5], pr[MAXN + 5];
bool npr[MAXN + 5];
inline void sieve( const int n ) {
mu[1] = 1;
rep ( i, 2, n ) {
if ( !npr[i] ) mu[pr[++pn] = i] = -1;
for ( int j = 1, t; j <= pn && ( t = i * pr[j] ) <= n; ++j ) {
npr[t] = true;
if ( !( i % pr[j] ) ) break;
mu[t] = -mu[i];
}
}
}
bool vis[MAXN + 5];
int f[MAXN + 5];
inline void dfs( const int u, const int bas, const int fac ) {
vis[u] = true, f[u] = bas;
for ( int i = head[u], v; i; i = graph[i].nxt ) {
if ( !vis[v = graph[i].to] && !( v % fac ) ) {
dfs( v, bas, fac ), addeq( f[u], mul( f[u], f[v] ) );
}
}
}
inline int solve( const int bas, const int fac ) {
for ( int i = fac; i <= n; i += fac ) if ( !vis[i] ) dfs( i, bas, fac );
int ret = 0;
for ( int i = fac; i <= n; i += fac ) addeq( ret, f[i] ), vis[i] = false;
return ret;
}
int main() {
freopen( "mushroom.in", "r", stdin );
freopen( "mushroom.out", "w", stdout );
n = rint();
rep ( i, 2, n ) link( rint(), rint() );
sieve( n );
int ans = 0;
rep ( i, 1, n ) rep ( j, 1, n / i ) {
addeq( ans, ( solve( i, i * j ) * mu[j] + MOD ) % MOD );
}
wint( ans ), putchar( '
' );
return 0;
}