POJ - 1363 Rails
Description
There is a famous railway station in PopPush City. Country there is incredibly hilly. The station was built in last century. Unfortunately, funds were extremely limited that time. It was possible to establish only a surface track.
Moreover, it turned out that the station could be only a dead-end one (see picture) and due to lack of available space it could have only one track.
The local tradition is that every train arriving from the direction A continues in the direction B with coaches reorganized in some way. Assume that the train arriving from the direction A has N <= 1000 coaches numbered in increasing order 1, 2, ..., N. The chief for train reorganizations must know whether it is possible to marshal coaches continuing in the direction B so that their order will be a1, a2, ..., aN. Help him and write a program that decides whether it is possible to get the required order of coaches. You can assume that single coaches can be disconnected from the train before they enter the station and that they can move themselves until they are on the track in the direction B. You can also suppose that at any time there can be located as many coaches as necessary in the station. But once a coach has entered the station it cannot return to the track in the direction A and also once it has left the station in the direction B it cannot return back to the station.
The local tradition is that every train arriving from the direction A continues in the direction B with coaches reorganized in some way. Assume that the train arriving from the direction A has N <= 1000 coaches numbered in increasing order 1, 2, ..., N. The chief for train reorganizations must know whether it is possible to marshal coaches continuing in the direction B so that their order will be a1, a2, ..., aN. Help him and write a program that decides whether it is possible to get the required order of coaches. You can assume that single coaches can be disconnected from the train before they enter the station and that they can move themselves until they are on the track in the direction B. You can also suppose that at any time there can be located as many coaches as necessary in the station. But once a coach has entered the station it cannot return to the track in the direction A and also once it has left the station in the direction B it cannot return back to the station.
Input
The input consists of blocks of lines. Each block except the last describes one train and possibly more requirements for its reorganization. In the first line of the block there is the integer N described above. In each of the
next lines of the block there is a permutation of 1, 2, ..., N. The last line of the block contains just 0.
The last block consists of just one line containing 0.
The last block consists of just one line containing 0.
Output
The output contains the lines corresponding to the lines with permutations in the input. A line of the output contains Yes if it is possible to marshal the coaches in the order required on the corresponding line of the input. Otherwise
it contains No. In addition, there is one empty line after the lines corresponding to one block of the input. There is no line in the output corresponding to the last ``null'' block of the input.
Sample Input
5 1 2 3 4 5 5 4 1 2 3 0 6 6 5 4 3 2 1 0 0
Sample Output
Yes No Yes
题意:要按1-n序列入栈,求给出的序列是否是合理的出栈序列
思路:模拟栈的过程。两个指针,一个指向当前的出栈序列位置,一个指向入栈序列的位置,当当前出栈数是大于入栈的数的话就要将入栈的数压入栈,相等就移除,小的话就推断当前入栈数和栈顶的大小
#include <iostream> #include <cstring> #include <cstdio> #include <algorithm> #include <stack> using namespace std; const int MAXN = 1005; stack<int> st; int n, num[MAXN]; int main() { while (scanf("%d", &n) != EOF && n) { while (scanf("%d", &num[1]) && num[1]) { for (int i = 2; i <= n; i++) scanf("%d", &num[i]); int ans = 1; int cur = 1, cnt = 1; while (!st.empty()) st.pop(); while (cur <= n) { if (num[cur] > cnt) st.push(cnt++); else if (num[cur] == cnt) { cur++; cnt++; } else if (!st.empty()) { if (st.top() != num[cur]) { ans = 0; break; } st.pop(); cur++; } } if (ans) printf("Yes\n"); else printf("No\n"); } printf("\n"); } return 0; }