Datasets:

hackercupai
/

hackercup

	// Smart Carts
	// Solution by Jacob Plachta

	#include <algorithm>
	#include <functional>
	#include <numeric>
	#include <iostream>
	#include <iomanip>
	#include <cstdio>
	#include <cmath>
	#include <complex>
	#include <cstdlib>
	#include <ctime>
	#include <cstring>
	#include <cassert>
	#include <string>
	#include <vector>
	#include <list>
	#include <map>
	#include <set>
	#include <unordered_set>
	#include <deque>
	#include <queue>
	#include <stack>
	#include <bitset>
	#include <sstream>
	using namespace std;

	#define LL long long
	#define LD long double
	#define PR pair<int,int>

	#define Fox(i,n) for (i=0; i<n; i++)
	#define Fox1(i,n) for (i=1; i<=n; i++)
	#define FoxI(i,a,b) for (i=a; i<=b; i++)
	#define FoxR(i,n) for (i=(n)-1; i>=0; i--)
	#define FoxR1(i,n) for (i=n; i>0; i--)
	#define FoxRI(i,a,b) for (i=b; i>=a; i--)
	#define Foxen(i,s) for (i=s.begin(); i!=s.end(); i++)
	#define Min(a,b) a=min(a,b)
	#define Max(a,b) a=max(a,b)
	#define Sz(s) int((s).size())
	#define All(s) (s).begin(),(s).end()
	#define Fill(s,v) memset(s,v,sizeof(s))
	#define pb push_back
	#define mp make_pair
	#define x first
	#define y second

	template<typename T> T Abs(T x) { return(x < 0 ? -x : x); }
	template<typename T> T Sqr(T x) { return(x * x); }
	string plural(string s) { return(Sz(s) && s[Sz(s) - 1] == 'x' ? s + "en" : s + "s"); }

	const int INF = (int)1e9;
	const LD EPS = 1e-12;
	const LD PI = acos(-1.0);

	#define GETCHAR getchar_unlocked

	bool Read(int& x)
	{
	char c, r = 0, n = 0;
	x = 0;
	for (;;)
	{
	c = GETCHAR();
	if ((c < 0) && (!r))
	return(0);
	if ((c == '-') && (!r))
	n = 1;
	else
	if ((c >= '0') && (c <= '9'))
	x = x * 10 + c - '0', r = 1;
	else
	if (r)
	break;
	}
	if (n)
	x = -x;
	return(1);
	}

	#define LIM 705

	int N;
	int nxt[2][LIM], prv[2][LIM];
	vector<int> seq[2][2];
	int L[2][2];
	PR pos[2][LIM];

	int F[2], subS[2];
	vector<int> CS;
	int csInd, sumC, baseAns;

	int ProcessQuery0(int* K)
	{
	int i, ans = 0;
	// check whether either initial line is too long to be valid
	Fox(i, 2)
	if (L[0][i] > K[i])
	return(-1);
	// count initially-satisfied carts
	Fox(i, N)
	ans += nxt[0][i] == nxt[1][i];
	return(ans);
	}

	void PrecomputeForQuery1(int C)
	{
	int i, j;
	// determine which carts are free
	Fox(i, 2)
	F[i] = min(C - L[0][1 - i], L[0][i]);
	auto IsFree = [&](int i, int e) { // if e=1, include non-free, accessible latches
	PR p = pos[0][i];
	return(p.y > L[0][p.x] - F[p.x] - e);
	};
	// compute number of potentially-satisfiable carts
	baseAns = 0;
	Fox(i, N)
	baseAns += nxt[0][i] == nxt[1][i] \|\| // initially satisfied?
	(IsFree(i, 0) && IsFree(nxt[1][i], 1)); // free, and target accessible?
	// split free, potentially-satisfiable carts into chains
	// and compute achievable subset sums of chain lengths
	sumC = 0;
	Fill(subS, 0);
	bitset<LIM> BC = 1;
	Fox(i, 2)
	{
	auto& s = seq[1][i];
	int c = 0, f = -1;
	Fox(j, Sz(s))
	{
	if (!IsFree(s[j], 0))
	continue;
	c++;
	// chain forced to belong to a certain line?
	if (c == 1 && j && IsFree(s[j - 1], 1))
	f = pos[0][s[j - 1]].x;
	// chain ends with this cart?
	if (j + 1 == Sz(s) \|\| !IsFree(s[j + 1], 0))
	{
	if (f < 0)
	sumC += c, BC \|= (BC << c);
	else
	subS[f] += c;
	c = 0, f = -1;
	}
	}
	}
	// store results
	CS.clear();
	Fox(i, sumC + 1)
	if (BC[i])
	CS.pb(i);
	csInd = 0;
	}

	int ProcessQuery1(int* K)
	{
	// compute space for free carts in each line
	int i, S[2];
	Fox(i, 2)
	S[i] = K[i] - (L[0][i] - F[i]) - subS[i];
	// check whether all free cart chains may be packed into the lines
	if (min(S[0], S[1]) < 0)
	return(baseAns - 1);
	while (csInd + 1 < Sz(CS) && CS[csInd + 1] <= S[0])
	csInd++;
	if (sumC - CS[csInd] <= S[1])
	return(baseAns);
	return(baseAns - 1); // 1 cart must remain unsatisfied due to chain breakage
	}

	int ProcessQuery2(int* K)
	{
	int i;
	// check whether either target line is too long to be fully satisfied
	Fox(i, 2)
	if (L[1][i] > K[i])
	return(N - 1);
	return(N);
	}

	int ProcessQuery(int d, int c, int x, int y)
	{
	int i, K[2] = { min(c, x), min(c, y) };
	// check whether either initial line is too long to be valid
	Fox(i, 2)
	if (L[0][i] > c)
	return(-1);
	// check whether there are too many carts to form valid final lines
	if (N > K[0] + K[1])
	return(-1);
	return d == 0
	? ProcessQuery0(K)
	: d == 1
	? ProcessQuery1(K)
	: ProcessQuery2(K);
	}

	void ProcessCase()
	{
	int i, j, z;
	// init
	Fill(prv, -1);
	// input
	Read(N);
	Fox(i, N)
	{
	Fox(z, 2)
	{
	Read(nxt[z][i]), nxt[z][i]--;
	prv[z][nxt[z][i]] = i;
	}
	}
	// split into lines (initial/target)
	Fox(z, 2)
	{
	Fox(i, 2)
	{
	seq[z][i].clear();
	j = N + i;
	while (j >= 0)
	{
	pos[z][j] = mp(i, Sz(seq[z][i]));
	seq[z][i].pb(j);
	j = prv[z][j];
	}
	L[z][i] = Sz(seq[z][i]) - 1;
	}
	}
	// process queries
	int d, c, x, y;
	LL G[LIM] = { 0 };
	Fox(d, min(3, N + 1))
	{
	Fox(c, N + 1)
	{
	if (d == 1)
	PrecomputeForQuery1(c);
	Fox(x, N + 1)
	{
	Fox(y, N + 1)
	G[ProcessQuery(d, c, x, y) + 1] += d == 2 ? N - 1 : 1;
	}
	}
	}
	Fox(i, N + 2)
	printf(" %lld", G[i]);
	printf("\n");
	}

	int main()
	{
	int T, t;
	Read(T);
	Fox1(t, T)
	{
	printf("Case #%d:", t);
	ProcessCase();
	}
	return(0);
	}