|시간 제한||메모리 제한||제출||정답||맞은 사람||정답 비율|
|3 초||256 MB||4||4||3||100.000%|
Consider a list of numbers with two operations:
insert number--- adds the specified number to the end of the list.
delete number--- removes the first occurrence of the specified number from the list. If the list does not contain the number specified, no changes are performed.
For example: the result of the insertion of a number 4 to the list $[1, 2, 1]$ is the list $[1, 2, 1, 4]$. If we delete the number $1$ from this list, we get the list $[2, 1, 4]$, but if we delete the number $3$ from the list $[1, 2, 1, 4]$, the list stays unchanged.
The list is homogeneous if it contains at least two equal numbers and the list is heterogeneous if it contains at least two different numbers. For example: the list $[2, 2]$ is homogeneous, the list $[2, 1, 4]$ is heterogeneous, the list $[1, 2, 1, 4]$ is both, and the empty list is neither homogeneous nor heterogeneous.
Write a program that handles a number of the operations
delete on the empty list and determines list's homogeneity and heterogeneity after each operation.
The first line of the input file contains an integer number $n$ --- the number of operations to handle ($1 \le n \le 100\,000$).
Following $n$ lines contain one operation description each. The operation description consists of a word
delete, followed by an integer number $k$ --- the operation argument ($-10^9 \le k \le 10^9$).
For each operation output a line, containing a single word, describing the state of the list after the operation:
both--- if the list is both homogeneous and heterogeneous.
homo--- if the list is homogeneous, but not heterogeneous.
hetero--- if the list is heterogeneous, but not homogeneous.
neither--- if the list is neither homogeneous nor heterogeneous.
11 insert 1 insert 2 insert 1 insert 4 delete 1 delete 3 delete 2 delete 1 insert 4 delete 4 delete 4
neither hetero both both hetero hetero hetero neither homo neither neither