Why Did the Cow Cross the Road II
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Farmer John is continuing to ponder the issue of cows crossing the road through
his farm, introduced in the preceding problem. He realizes that interaction
between some pairs of breeds is actually acceptable if the breeds are friendly,
a property that turns out to be easily characterized in terms of breed ID:
breeds \(a\) and \(b\) are friendly if \(|a - b| \leq 4\), and unfriendly otherwise.
It is ok for cows to wander into fields designated for other breeds, as long as
they are friendly.
Given the ordering of \(N\) fields on both sides of the road through FJ's farm
(again, with exactly one field for each breed on each side), please help FJ
determine the maximum number of crosswalks he can draw over his road, such that
no two intersect, and such that each crosswalk joins a pair of fields
containing two breeds that are friendly. Each field can be accessible
via at most one crosswalk (so crosswalks don't meet at their endpoints).
Problem credits: Brian Dean
Problem credits: Brian Dean
The first line of input contains \(N\) (\(1 \leq N \leq 100,000\)). The next \(N\)
lines describe the order, by breed ID, of fields on one side of the road; each
breed ID is an integer in the range \(1 \ldots N\). The last \(N\) lines describe
the order, by breed ID, of the fields on the other side of the road. Each
breed ID appears exactly once in each ordering.
Please output the maximum number of disjoint "friendly crosswalks" Farmer John
can draw across the road.
nocross.innocross.out6
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15riseoj 작성
출처 올림피아드 > USACO > 2016-2017 > February > Platinum
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Why Did the Cow Cross the Road II
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Why Did the Cow Cross the Road II