Wormhole Sort
의견: 0
Farmer John's cows have grown tired of his daily request that they sort
themselves before leaving the barn each morning. They have just completed their
PhDs in quantum physics, and are ready to speed things up a bit.
This morning, as usual, Farmer John's \(N\) cows (\(1 \leq N \leq 10^5\)),
conveniently numbered \(1 \dots N\), are scattered throughout the barn at \(N\)
distinct locations, also numbered \(1 \dots N\), such that cow \(i\) is at location
\(p_i\). But this morning there are also \(M\) wormholes (\(1 \leq M \leq 10^5\)),
numbered \(1 \dots M\), where wormhole \(i\) bidirectionally connects location \(a_i\)
with location \(b_i\), and has a width \(w_i\)
(\(1\le a_i,b_i\le N, a_i\neq b_i, 1\le w_i\le 10^9\)).
At any point in time, two cows located at opposite ends of a wormhole may choose
to simultaneously swap places through the wormhole. The cows must perform such
swaps until cow \(i\) is at location \(i\) for \(1 \leq i \leq N\).
The cows are not eager to get squished by the wormholes. Help them maximize the
width of the least wide wormhole which they must use to sort themselves.
It is guaranteed that it is possible for the cows to sort themselves.
Problem credits: Dhruv Rohatgi
SCORING
- Test cases 3-5 satisfy \(N,M\le 1000.\)
- Test cases 6-10 satisfy no additional constraints.
Problem credits: Dhruv Rohatgi
The first line contains two integers, \(N\) and \(M\).
The second line contains the \(N\) integers \(p_1, p_2, \dots, p_N\). It is
guaranteed that \(p\) is a permutation of \(1\ldots N.\)
For each \(i\) between \(1\) and \(M\), line \(i+2\) contains the integers \(a_i\), \(b_i\),
and \(w_i\).
A single integer: the maximum minimal wormhole width which a cow must squish
itself into during the sorting process. If the cows do not need any wormholes to
sort themselves, output \(-1\).
wormsort.inwormsort.out4 4
3 2 1 4
1 2 9
1 3 7
2 3 10
2 4 39Here is one possible way to sort the cows using only wormholes of width at least
9:
- Cow 1 and cow 2 swap positions using the third wormhole.
- Cow 1 and cow 3 swap positions using the first wormhole.
- Cow 2 and cow 3 swap positions using the third wormhole.
4 1
1 2 3 4
4 2 13-1No wormholes are needed to sort the cows.
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출처 올림피아드 > USACO > 2019-2020 > January > Silver
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Wormhole Sort
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Wormhole Sort