Boring Class
TimeLimit:3000MS MemoryLimit:65536KB
64-bit integer IO format:%I64d
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Problem Description
Mr. Zstu and Mr. Hdu are taking a boring class , Mr. Zstu comes up with a problem to kill time, Mr. Hdu thinks it’s too easy, he solved it very quickly, what about you guys?
Here is the problem:
Give you two sequences ${L_1,L_2,...,L_n}$ and ${R_1,R_2,...,R_n}$.
Your task is to find a longest subsequence ${v_1,v_2,...v_m}$ satisfies
$v_1 \geq 1$,$v_m \leq n$,$v_i < v_{i+1}$ .(for i from 1 to m - 1)
$L_{v_i} \geq L_{v_{i+1}}$,$R_{v_i} \leq R_{v_{i+1}}$(for i from 1 to m - 1)
If there are many longest subsequence satisfy the condition, output the sequence which has the smallest lexicographic order.
Here is the problem:
Give you two sequences ${L_1,L_2,...,L_n}$ and ${R_1,R_2,...,R_n}$.
Your task is to find a longest subsequence ${v_1,v_2,...v_m}$ satisfies
$v_1 \geq 1$,$v_m \leq n$,$v_i < v_{i+1}$ .(for i from 1 to m - 1)
$L_{v_i} \geq L_{v_{i+1}}$,$R_{v_i} \leq R_{v_{i+1}}$(for i from 1 to m - 1)
If there are many longest subsequence satisfy the condition, output the sequence which has the smallest lexicographic order.
Input
There are several test cases, each test case begins with an integer n.
$1 \leq n \leq 50000$
Both of the following two lines contain n integers describe the two sequences.
$1 \leq L_i,R_i \leq 10^9$
$1 \leq n \leq 50000$
Both of the following two lines contain n integers describe the two sequences.
$1 \leq L_i,R_i \leq 10^9$
Output
For each test case ,output the an integer m indicates the length of the longest subsequence as described.
Output m integers in the next line.
Output m integers in the next line.
SampleInput
5 5 4 3 2 1 6 7 8 9 10 2 1 2 3 4
SampleOutput
5 1 2 3 4 5 1 1