oj.uz

Submission #109043

# Submission time Handle Problem Language Result Execution time Memory
109043 2019-05-04T06:02:53 Z ryansee Circle selection (APIO18_circle_selection) C++14
23 / 100
 1740 ms 68308 KB 
#include "bits/stdc++.h"
using namespace std;
#define FAST ios_base::sync_with_stdio(false); cin.tie(0);
#define LLINF ((long long) 1e18)//1234567890987654321
#define INF 1234567890ll
#define pb push_back
#define ins insert
#define f first
#define s second	
#define db 0
#define EPS (1e-7)    //0.0000001 the value
#define PI (acos(-1))
#define MAXN (300006)
#define MAXK 26
#define MAXX 15000006
#define ll long long int 
#define ld long double
mt19937 rng(chrono::steady_clock::now().time_since_epoch().count());    //can be used by calling rng() or shuffle(A, A+n, rng)
#define FOR(ii, ss, ee) for(ll ii = ss; ii < ee; ++ii)
#define space " "
#define cbr cerr << "hi\n"
#define mmst(x, v) memset((x), v, sizeof ((x)))
#define siz(x) ((ll)x.size())
#define ph push
#define btinpct(x) __builtin_popcountll(x)
#define p2(x) (1LL<<(x))
#define all(x) (x).begin(), (x).end()
#define lbd(x, y) lower_bound(all(x), y)
#define ubd(x, y) upper_bound(all(x), y)
typedef pair <ll, ll> pi;
typedef pair <ll, pi> spi;
typedef pair <pi, pi> dpi;
inline ll rand(ll x, ll y) { ++y; return (rng() % (y-x)) + x; } //inclusivesss
ll n; bool s2 = 1;
pi A[MAXN], C[MAXN];
bool done[MAXN];
int ans[MAXN];
#define sq(x) ((x)*(x))
ld sqr(ll x) { return (x ? sqrtl(x) : 0); }
ld mdist(ll a, ll b, ll c, ll d) { return sqr( sq(llabs(a-c)) + sq(llabs(b-d)) ); }
string st1() {
	sort(A,A+n, [] (pi x, pi y) { if(x.f!=y.f) return x.f > y.f; else return x.s < y.s; } );
	FOR(ii,0,n) {
		ll i = A[ii].s;
		ll r = A[ii].f; 
		if(done[i]) continue;
		ans[i] = i;
		FOR(j,ii+1,n) {
			if(!done[A[j].s] && mdist(C[i].f,C[i].s,C[A[j].s].f,C[A[j].s].s) <= (ld)r + (ld)A[j].f) {
				done[A[j].s] = 1;
				ans[A[j].s] = i;
			}
		}
	}
	FOR(i,0,n) cout << ans[i] + 1 << ' '; cout << '\n';
	string s = ""; FOR(i,0,n) s += to_string(ans[i]+1); return s;
}
string st2() {
	sort(A,A+n, [] (pi x, pi y) { if(x.f!=y.f) return x.f > y.f; else return x.s < y.s; } );
	mmst(ans,0);
	multiset <pi> ms_smol,ms_big; // x-coord, radius, index
	FOR(i,0,n) {
		ms_smol.ins(pi(C[A[i].s].f+A[i].f, i));
		ms_big.ins(pi(C[A[i].s].f-A[i].f, i));
	}
	FOR(i,0,n) {
		if(ms_smol.find(pi(C[A[i].s].f+A[i].f, i)) == ms_smol.end()) { continue; }
		while(1) {
			auto itrrr = ms_big.find(pi(C[A[i].s].f-A[i].f, i));
			auto itr2 = next(itrrr);
			if(itr2==ms_big.end()) break;
			if(C[A[i].s].f + A[i].f >= itr2->f) { ans[A[itr2->s].s] = A[i].s; ms_smol.erase(ms_smol.find(pi(C[A[itr2->s].s].f+A[itr2->s].f, itr2->s))); ms_big.erase(itr2); }
			else break;
		}
		while(1) {
			auto itrrr = ms_smol.find(pi(C[A[i].s].f+A[i].f, i)); if(itrrr==ms_smol.begin()) break;
			auto itr2 = prev(itrrr);
			if(C[A[i].s].f - A[i].f <= itr2->f) { ans[A[itr2->s].s] = A[i].s; ms_smol.erase(itr2); ms_big.erase(ms_big.find(pi(C[A[itr2->s].s].f-A[itr2->s].f, itr2->s))); }
			else break;
		}
		ms_smol.erase(ms_smol.find(pi(C[A[i].s].f+A[i].f,i)));
		ms_big.erase(ms_big.find(pi(C[A[i].s].f-A[i].f,i)));
		ans[A[i].s] = A[i].s;
	}
	FOR(i,0,n) cout << ans[i]+1 << ' '; cout << '\n';
	string s = ""; FOR(i,0,n) s += to_string(ans[i]+1); return s;
}
// ll mdist(ll a, ll b, ll c, ll d) { return llabs(a-c)+llabs(b-d); }
void st3() {
	vector<ll>inter(n,0); vector<bool>re(n,0); set <pi> ms;
	vector <pi> events;
	FOR(i,0,n) events.pb(pi(C[i].s-A[i].f,i)), events.pb(pi(C[i].s+A[i].f,-i-1));
	sort(all(events), [] (pi x, pi y) { if(x.f != y.f) return x.f < y.f; else return x.s > y.s; } );
	for(auto j : events) {
		ll i = j.s;
		if(i>=0) { ll r = A[i].f; ll x = C[i].f;
			bool in = 1; pi near = pi(LLINF, LLINF);
			if(!ms.empty()) {
				// pi near = LLINF;
				auto itr = ms.lower_bound(pi(x,0));
				if(itr != ms.end()) near = min(near, pi(mdist(C[itr->s].f,C[itr->s].s, C[i].f, C[i].s)-(ld)A[itr->s].f, itr->s));
				if(itr != ms.begin()) { --itr; near = min(near, pi(mdist(C[itr->s].f,C[itr->s].s, C[i].f, C[i].s)-(ld)A[itr->s].f, itr->s)); }
			    assert(near.f != LLINF); 
				if(near.f-EPS <= (ld)r) in = 0;
			}
			if(in) {
				ms.ins(pi(x,i)); re[i] = 1;
			} else {
				re[i] = 0; assert(re[near.s]);
				assert((ms.find(pi(C[near.s].f, near.s))!=ms.end()));
				// assert(ms.find(pi(C[near.s].f+A[near.s].f, near.s))!=ms.end());
				ms.erase(ms.find(pi(C[near.s].f, near.s)));
				// ms.erase(ms.find(pi(C[near.s].f+A[near.s].f, near.s)));
				re[near.s] = 0;
				inter[i] = near.s;
				inter[near.s] = i;
			}
		} else {
			i = -i-1; if(re[i] == 0) continue;
			ll r = A[i].f; ll x = C[i].f;
			ms.erase(ms.find(pi(x,i)));
//  			bool in = 1; pi near = pi(LLINF, LLINF);
// 			if(!ms.empty()) {
// 				// pi near = LLINF;
// 				auto itr = ms.lower_bound(pi(x,0));
// 				if(itr != ms.end()) near = min(near, pi(mdist(C[itr->s].f,C[itr->s].s, C[i].f, C[i].s)-(ld)A[itr->s].f, itr->s));
// 				if(itr != ms.begin()) { --itr; near = min(near, pi(mdist(C[itr->s].f,C[itr->s].s, C[i].f, C[i].s)-(ld)A[itr->s].f, itr->s)); }
// 			    assert(near.f != LLINF); 
// 				if(near.f-EPS <= (ld)r) in = 0;
// 			}
// 			if(!in) {
// 				re[i] = 0; assert(re[near.s]);
// 				assert((ms.find(pi(C[near.s].f, near.s))!=ms.end()));
// 				// assert(ms.find(pi(C[near.s].f+A[near.s].f, near.s))!=ms.end());
// 				ms.erase(ms.find(pi(C[near.s].f, near.s)));
// 				// ms.erase(ms.find(pi(C[near.s].f+A[near.s].f, near.s)));
// 				re[near.s] = 0;
// 				inter[i] = near.s;
// 				inter[near.s] = i;
// 			}
            auto itr = ms.lower_bound(pi(x,0));
            if(itr != ms.end()) assert(itr->f > x);
            if(itr != ms.begin() && itr != ms.end()) {
                ll a = prev(itr)->s, b = itr->s;
                if(mdist(C[a].f,C[a].s,C[b].f,C[b].s) <= (ld)A[a].f + (ld)A[b].f){
                    re[a] = re[b] = 0;
                    inter[a] = b;
                    inter[b] = a;
                    itr=ms.erase(prev(itr));
                    ms.erase(itr);
                }
            }
		}
	}
	FOR(i,0,n) ans[i] = i;
	FOR(i,0,n) if(!re[i]&&(A[inter[i]].f>A[i].f||(A[inter[i]].f==A[i].f&&inter[i]<i))) { ans[i] = inter[i]; } 
	FOR(i,0,n) cout << ans[i]+1 << ' '; cout<<'\n';
}
vector<pi>in;
bool s4 = 1; ll R = -1;

ll magic = 5; // odd number pls
bool inter(ll i, ll j) {
	if(done[j]) return 1;
	if(mdist(C[i].f, C[i].s, C[j].f, C[j].s) <= (ld)A[i].f + (ld) A[j].f) {
// 		assert(i < j);
		done[j] = 1;
		ans[j] = i;
		return 1;
	}
	else return 0;
}

unordered_map <ll, int> mp;
vector <ll> d;
vector<pi>ind[MAXN],tmp[MAXN];
int latest = 0;
void split() { 
	FOR(i,0,MAXN) tmp[i].clear();
	ll new_R = R/2; if(new_R%2)new_R++;
	ll co = 1;
	mp.clear();
	FOR(i,1,latest+1) {
		if(ind[i].empty()) continue; assert(co < MAXN);
		if(ind[i].size()==1) { mp[C[ind[i][0].s].f/new_R] = co; tmp[co++].pb(ind[i][0]); }
		else {
			ll one = LLINF;
			ll two = 0;
			for(auto j : ind[i]) two = max(two, C[j.s].f/new_R);
			for(auto j : ind[i]) one = min(one, C[j.s].f/new_R);
			// cerr << one << ' ' << two << '\n';
			for(auto j : ind[i]) {
				// cerr << C[j.s].f << ' ' << new_R << ' ' << C[j.s].f/new_R << '\n';
				if(C[j.s].f/new_R == one) { mp[C[j.s].f/new_R] = co; tmp[co].pb(j); }
				else if(C[j.s].f/new_R == two) { mp[C[j.s].f/new_R] = co + 1; tmp[co+1].pb(j); }
				else assert(0);
			}
			// cerr << '\n' << '\n';
			co += 2;
		}
	}
	R=new_R; latest = co-1;
			assert(co < MAXN);
	FOR(i,0,MAXN) ind[i]=tmp[i];
}
void st4() {
	FOR(i,0,n) {
		d.pb(C[i].f/R);
	}
	sort(all(d)); d.resize(unique(all(d))-d.begin());
	ll co = 1; for(auto i : d) mp[i] = co++; 
	FOR(i,0,n) {
		ind[mp[C[i].f/R]].pb(pi(C[i].s,i));
		latest = max(latest, mp[C[i].f/R]);
	}
	// FOR(i,1,latest+1) sort(all(ind[i]));
	int p[n+5];
	for(ll i=0;i<n;i++) p[i]=i;
	sort(p,p+n,[](ll x, ll y){if(A[x].f==A[y].f)return A[x].s<A[y].s; else return A[x].f>A[y].f;});
// 	assert(ind[0].empty());
	FOR(iii,0,n) {
		ll i = p[iii]; // cerr << i+1 << ' ';
		if(done[i]) continue;
		done[i] = 1;
		ans[i] = i; if(A[i].f < R/2) { split(); }
		ll x = mp[C[i].f/R], y = C[i].s;
		ll ii = i;
		FOR(i,x-magic/2,x+magic/2+1) {
			if(i <= 0)continue;
// 			ll d = llabs(x-i) * R + R;
// 			auto lower = ind[i].lower_bound(pi(sqr((4ll*sq(R))-sq(d))-y, 0));
// 			auto upper = (ind[i].upper_bound(pi(sqr((4ll*sq(R))-sq(d))+y, LLINF)));
// 			if(upper != ind[i].end() && pi(lower->f,lower->s) > pi(upper->f,upper->s)) continue;
// 			if(lower == ind[i].end()) continue;
			for(auto j = ind[i].begin(); j != ind[i].end();j++) {
				if(inter(ii,j->s)) {}
			}
		}
	}
	FOR(i,0,n) assert(done[i]);
	FOR(i,0,n) cout << ans[i] + 1 << ' ';
}
int main()
{
	// freopen("int","r",stdin); freopen("out","w",stdout);
	FAST
	cin >> n;
	FOR(i,0,n) {
		cin >> C[i].f >> C[i].s >> A[i].f; if(0)in.pb(pi(C[i].f,A[i].f));
		if(C[i].s) s2 = 0;
		A[i].s = i;
		if(R == -1) R = A[i].f;
		if(R != A[i].f) s4 = 0;
		R=max(R,A[i].f);
	} if(R%2)R++;
	// if(st1() != st2()) {
		
		// cerr << n << '\n';
		// for(auto i : in) cerr << i.f << ' ' << i.s << '\n';
		// assert(0);
	// }
	// assert(st1() == st2());
	if(n <= 5000&&0) {
		st1();
	} else if(s2&&0) {
		st2();
	} else if(s4||1) { // becos i edited editorial solution here (the AC solution)
		st4();
	}else { 
		st3();
	}
}
// 1 10 1 4 5 6 7 8 4 10 6
// 1 2 1 4 5 6 7 8 4 2 6
/*


3
5 0 3
10 0 2
20 0 8

4
1 0 3
10 0 5
15 0 1
20 0 10


8
1 4
14 12
6 10
0 6
14 0
9 6
3 2
0 0
* 
11
9 9 2
13 2 1
11 8 2
3 3 2
3 12 1
12 14 1
9 8 5
2 8 2
5 2 1
14 4 2
14 14 1
*/

Compilation message

circle_selection.cpp: In function 'std::__cxx11::string st1()':
circle_selection.cpp:19:25: warning: this 'for' clause does not guard... [-Wmisleading-indentation]
 #define FOR(ii, ss, ee) for(ll ii = ss; ii < ee; ++ii)
                         ^
circle_selection.cpp:55:2: note: in expansion of macro 'FOR'
  FOR(i,0,n) cout << ans[i] + 1 << ' '; cout << '\n';
  ^~~
circle_selection.cpp:55:40: note: ...this statement, but the latter is misleadingly indented as if it were guarded by the 'for'
  FOR(i,0,n) cout << ans[i] + 1 << ' '; cout << '\n';
                                        ^~~~
circle_selection.cpp: In function 'std::__cxx11::string st2()':
circle_selection.cpp:19:25: warning: this 'for' clause does not guard... [-Wmisleading-indentation]
 #define FOR(ii, ss, ee) for(ll ii = ss; ii < ee; ++ii)
                         ^
circle_selection.cpp:85:2: note: in expansion of macro 'FOR'
  FOR(i,0,n) cout << ans[i]+1 << ' '; cout << '\n';
  ^~~
circle_selection.cpp:85:38: note: ...this statement, but the latter is misleadingly indented as if it were guarded by the 'for'
  FOR(i,0,n) cout << ans[i]+1 << ' '; cout << '\n';
                                      ^~~~
circle_selection.cpp: In function 'void st3()':
circle_selection.cpp:120:7: warning: unused variable 'r' [-Wunused-variable]
    ll r = A[i].f; ll x = C[i].f;
       ^
circle_selection.cpp:19:25: warning: this 'for' clause does not guard... [-Wmisleading-indentation]
 #define FOR(ii, ss, ee) for(ll ii = ss; ii < ee; ++ii)
                         ^
circle_selection.cpp:157:2: note: in expansion of macro 'FOR'
  FOR(i,0,n) cout << ans[i]+1 << ' '; cout<<'\n';
  ^~~
circle_selection.cpp:157:38: note: ...this statement, but the latter is misleadingly indented as if it were guarded by the 'for'
  FOR(i,0,n) cout << ans[i]+1 << ' '; cout<<'\n';
                                      ^~~~
circle_selection.cpp: In function 'void st4()':
circle_selection.cpp:226:24: warning: unused variable 'y' [-Wunused-variable]
   ll x = mp[C[i].f/R], y = C[i].s;
                        ^

Subtask #1
0 / 7.0

# Verdict Execution time Memory Grader output
1 Correct 22 ms 14456 KB Output is correct
2 Correct 16 ms 14464 KB Output is correct
3 Correct 19 ms 14464 KB Output is correct
4 Correct 17 ms 14464 KB Output is correct
5 Correct 13 ms 14464 KB Output is correct
6 Correct 15 ms 14464 KB Output is correct
7 Correct 15 ms 14464 KB Output is correct
8 Correct 14 ms 14464 KB Output is correct
9 Correct 22 ms 14464 KB Output is correct
10 Correct 19 ms 14464 KB Output is correct
11 Correct 26 ms 14464 KB Output is correct
12 Correct 36 ms 14456 KB Output is correct
13 Correct 35 ms 14524 KB Output is correct
14 Correct 34 ms 14464 KB Output is correct
15 Correct 38 ms 14464 KB Output is correct
16 Correct 32 ms 14720 KB Output is correct
17 Correct 18 ms 14464 KB Output is correct
18 Correct 17 ms 14592 KB Output is correct
19 Correct 20 ms 15032 KB Output is correct
20 Correct 23 ms 14976 KB Output is correct
21 Correct 37 ms 15360 KB Output is correct
22 Runtime error 40 ms 29816 KB Execution killed with signal 11 (could be triggered by violating memory limits)
23 Halted 0 ms 0 KB -

Subtask #2
0 / 12.0

# Verdict Execution time Memory Grader output
1 Runtime error 283 ms 68308 KB Execution killed with signal 11 (could be triggered by violating memory limits)
2 Halted 0 ms 0 KB -

Subtask #3
0 / 15.0

# Verdict Execution time Memory Grader output
1 Runtime error 38 ms 28668 KB Execution killed with signal 11 (could be triggered by violating memory limits)
2 Halted 0 ms 0 KB -

Subtask #4
23.0 / 23.0

# Verdict Execution time Memory Grader output
1 Correct 1049 ms 43316 KB Output is correct
2 Correct 969 ms 54192 KB Output is correct
3 Correct 1740 ms 38240 KB Output is correct
4 Correct 925 ms 53092 KB Output is correct
5 Correct 982 ms 53728 KB Output is correct
6 Correct 1560 ms 36708 KB Output is correct

Subtask #5
0 / 30.0

# Verdict Execution time Memory Grader output
1 Correct 22 ms 14456 KB Output is correct
2 Correct 16 ms 14464 KB Output is correct
3 Correct 19 ms 14464 KB Output is correct
4 Correct 17 ms 14464 KB Output is correct
5 Correct 13 ms 14464 KB Output is correct
6 Correct 15 ms 14464 KB Output is correct
7 Correct 15 ms 14464 KB Output is correct
8 Correct 14 ms 14464 KB Output is correct
9 Correct 22 ms 14464 KB Output is correct
10 Correct 19 ms 14464 KB Output is correct
11 Correct 26 ms 14464 KB Output is correct
12 Correct 36 ms 14456 KB Output is correct
13 Correct 35 ms 14524 KB Output is correct
14 Correct 34 ms 14464 KB Output is correct
15 Correct 38 ms 14464 KB Output is correct
16 Correct 32 ms 14720 KB Output is correct
17 Correct 18 ms 14464 KB Output is correct
18 Correct 17 ms 14592 KB Output is correct
19 Correct 20 ms 15032 KB Output is correct
20 Correct 23 ms 14976 KB Output is correct
21 Correct 37 ms 15360 KB Output is correct
22 Runtime error 40 ms 29816 KB Execution killed with signal 11 (could be triggered by violating memory limits)
23 Halted 0 ms 0 KB -

Subtask #6
0 / 13.0

# Verdict Execution time Memory Grader output
1 Correct 22 ms 14456 KB Output is correct
2 Correct 16 ms 14464 KB Output is correct
3 Correct 19 ms 14464 KB Output is correct
4 Correct 17 ms 14464 KB Output is correct
5 Correct 13 ms 14464 KB Output is correct
6 Correct 15 ms 14464 KB Output is correct
7 Correct 15 ms 14464 KB Output is correct
8 Correct 14 ms 14464 KB Output is correct
9 Correct 22 ms 14464 KB Output is correct
10 Correct 19 ms 14464 KB Output is correct
11 Correct 26 ms 14464 KB Output is correct
12 Correct 36 ms 14456 KB Output is correct
13 Correct 35 ms 14524 KB Output is correct
14 Correct 34 ms 14464 KB Output is correct
15 Correct 38 ms 14464 KB Output is correct
16 Correct 32 ms 14720 KB Output is correct
17 Correct 18 ms 14464 KB Output is correct
18 Correct 17 ms 14592 KB Output is correct
19 Correct 20 ms 15032 KB Output is correct
20 Correct 23 ms 14976 KB Output is correct
21 Correct 37 ms 15360 KB Output is correct
22 Runtime error 40 ms 29816 KB Execution killed with signal 11 (could be triggered by violating memory limits)
23 Halted 0 ms 0 KB -